{"id":9747,"date":"2025-07-17T20:51:57","date_gmt":"2025-07-17T20:51:57","guid":{"rendered":"https:\/\/theory.esm.rochester.edu\/integral\/?page_id=9747"},"modified":"2025-08-26T13:05:07","modified_gmt":"2025-08-26T13:05:07","slug":"hofelich","status":"publish","type":"page","link":"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/","title":{"rendered":"Vignettes for Structural Hearing in the Music of Dmitri Shostakovich: Prolongational Approaches to Three Preludes"},"content":{"rendered":"\n\n\n\n\n<script type=\"text\/x-mathjax-config\"> \n\t\tMathJax.Hub.Config({ \n\t\t  messageStyle: \"none\" \n}); \n<\/script>\n\n\n\n<p><strong>Trevor C. Hofelich<\/strong><\/p>\n\n\n\n<h3 class=\"wp-block-heading\">Abstract<\/h3>\n\n\n\n<blockquote class=\"wp-block-quote is-layout-flow wp-block-quote-is-layout-flow\">\n<p>Schenkerian views of mixture and counterpoint address a wide range of chromatic activity in Dmitri Shostakovich\u2019s monotonal works. Emulating contrapuntal procedures in Johann Sebastian Bach\u2019s <em>Well-Tempered Clavier<\/em>, preludes in Shostakovich\u2019s Twenty-Four Preludes and Fugues, op. 87 (1950\u20131951) are especially amenable to linear analysis. Not only do the op. 87 preludes exhibit functional states, but they also express Shostakovich\u2019s meta-compositional musing on Baroque preludes. Although tonal operations are obscured by surface-level chromaticism, linear analyses of Prelude nos. 4, 13, and 22 contextualize post-tonal passages within broader tonal structures. Middleground examinations clarify how Shostakovich chromatically intensifies contrapuntal idioms without dismantling the function of impacted harmonies. This study expands on the work of David Fanning (2010) and Sarah Marlowe (2013), rendering models for structural hearing in Shostakovich\u2019s music while considering how post-tonal harmonies are produced when diatonic elements are modally lowered.<br><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/38-hofelich\/\" data-type=\"page\" data-id=\"9749\">View PDF<\/a><br><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/\" data-type=\"page\" data-id=\"9662\">Return to Volume 38<\/a><\/p>\n<\/blockquote>\n\n\n\n<p><strong>Keywords and Phrases<\/strong>: Shostakovich, prolongational analysis, neo-Riemannian theory, Russian modal theory, triadic post-tonality, linear chromaticism<\/p>\n\n\n\n<p class=\"has-drop-cap\">A tonal approach to Dmitri Shostakovich\u2019s concert music must inevitably confront its post-tonal qualities. His melodic-harmonic language, situated between late nineteenth-century Romanticism and twentieth-century modernism, stretches the surface boundaries of tonality toward modal, chromatic, and triadic post-tonal spaces. Both Russian and Western scholars have examined the relationship between tonal, modal, and chromatic spaces in Shostakovich\u2019s works, but few studies have explored the linear organization and functionality of these spaces from a prolongational perspective. Research by David Fanning (2010) and Sarah Marlowe (2013) demonstrates the capacity for prolongational methodologies to elucidate tonal processes in Shostakovich\u2019s music.<span id='easy-footnote-1-9747' class='easy-footnote-margin-adjust'><\/span><span class='easy-footnote'><a href='https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/#easy-footnote-bottom-1-9747' title='Ellen Bakulina (2015, 2018) has also contributed significant prolongational approaches to the music of Rachmaninoff, another Russian composer whose music, like Shostakovich\u2019s, exhibits tonal, modal, and post-tonal properties.'><sup>1<\/sup><\/a><\/span> Expanding on these approaches, this study addresses a prominent gap in Shostakovich studies, prioritizing large-scale tonal structures in three preludes from the Twenty-Four Preludes and Fugues, op. 87 (1950\u20131951) through the contextualization of chromatic and modally derived scalar systems within broader functional frameworks.<\/p>\n\n\n\n<p>Schenkerian views of mixture and tonicization account for a large variety of chromatic activity in monotonal works.<span id='easy-footnote-2-9747' class='easy-footnote-margin-adjust'><\/span><span class='easy-footnote'><a href='https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/#easy-footnote-bottom-2-9747' title='The processes of simple, secondary, and double mixture contextualize highly chromatic passages within tonal fields (Brown 2005, 44). In combination with counterpoint that generates a harmonic state or motion toward a tonal goal, these processes aid in the linear interpretations of both small- and large-scale progressions featuring distantly related triads. While some traditional theorists and Schenker himself have imposed limitations on prolongational methodologies to music outside the Bach-to-Brahms canon (Straus 1987), this paper adopts a less restrictive mentality on linear possibilities that resonates with the works of Felix Salzer (1952), James Baker (1983, 1990), Ellen Bakulina (2015, 2018), Matthew Brown (1986, 1993), Sarah Marlowe (2013), David Fanning (2010), Joel Lester (1970), Fred Lerdahl (1989), David Forrest (2010), and Timothy Jackson (2024).&amp;nbsp;'><sup>2<\/sup><\/a><\/span> While much of Shostakovich\u2019s music resembles the late-Romantic tonal traditions of Pyotr Ilyich Tchaikovsky and Nikolai Rimsky-Korsakov, his post-tonal language expands the boundaries of functional triadic relationships. On the surface, distances between remotely related keys appear mitigated through linear chromaticism and triadic post-tonal voice leading (Hussey 2003). At deeper levels of structure, highly chromatic passages articulate the same functional states as the diatonic counterparts they intensify. The op. 87 preludes constitute a blend of conventional practice and reconstructions of tonality in triadic post-tonal spaces.<span id='easy-footnote-3-9747' class='easy-footnote-margin-adjust'><\/span><span class='easy-footnote'><a href='https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/#easy-footnote-bottom-3-9747' title='The term triadic post-tonality is derived from Richard Cohn (1998, 168). While Russian studies imply that the core of Shostakovich\u2019s writing is diatonic, passages featuring chromatically related triads often do not exhibit standard functional relationships but showcase stepwise voice leading that is characteristic of triadic post-tonal chord changes.'><sup>3<\/sup><\/a><\/span> They also express Shostakovich\u2019s meta-compositional musing on Baroque preludes, especially those in Johann Sebastian Bach\u2019s <em>Well-Tempered Clavier <\/em>(<em>WTC<\/em>), emulating Rule of the Octave patterns and idiomatic octave descents in their first cycles that expand a single harmony. Tonal procedures are obscured by triadic post-tonality and modal lowering on the surface; however, the following analyses of Prelude nos. 4, 13, and 22 from the Twenty-Four Preludes and Fugues contextualize these post-tonal intensifications within broader middleground structures. Considering mixture and counterpoint in each prelude elucidates how the music establishes a harmonic state and generates motion toward a tonal goal. This study also considers how chromatic harmonies in each prelude are produced when their diatonic elements are modally lowered.<\/p>\n\n\n\n<h2 class=\"wp-block-heading\"><strong>1. Reconstruction of Tonality<\/strong><\/h2>\n\n\n\n<p>Shostakovich\u2019s emulation of Baroque prelude practice in the Twenty-Four Preludes and Fugues provides many access points for prolongational analysis. To prepare for the following discussions of structural hearing in the preludes, it is important to examine these access points within the context of reconstructed tonal models in Shostakovich\u2019s post-1936 works, integration of Baroque idioms in the op. 87 preludes and meta-compositional references to Bach\u2019s <em>WTC<\/em>, and broader linear and transformational approaches to post-tonal voice leading. In the discussion of this final concern, the opening thematic statement of Shostakovich\u2019s String Quartet no. 9 in E$$\\flat$$ Major, op. 117, II (1964) is used as a characteristic model of hexatonic prolongation.<\/p>\n\n\n\n<p>While his post-1936 works are responsive to linear approaches due to the rehabilitation of more traditional tonal practices into his music following the <em>Pravda <\/em>attacks on his opera <em>Lady Macbeth of the Mtsensk District<\/em>, op. 29 (1930\u20131932; later revised as op. 114) and ballet <em>The Limpid Stream<\/em>, op. 39 (1934\u20131935), the Twenty-Four Preludes and Fugues are remarkably approachable due to the context in which they were composed.<span id='easy-footnote-4-9747' class='easy-footnote-margin-adjust'><\/span><span class='easy-footnote'><a href='https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/#easy-footnote-bottom-4-9747' title='The editorial \u201cMuddle Instead of Music\u201d appeared in &lt;em&gt;Pravda&lt;\/em&gt; on 28 January 1936. Shostakovich was subjected to an additional attack in &lt;em&gt;Pravda&lt;\/em&gt; on February 6 via the editorial \u201cBalletic Falsity\u201d for the ballet &lt;em&gt;The Limpid Stream&lt;\/em&gt;. These unsigned editorials are believed to be penned (at least partially) by Stalin\u2014the term \u201cmuddle\u201d was a common Stalinist utterance flung toward \u201cformalist\u201d art, literature, and music that undermined nationalist propaganda and reflected cultural depravity. Stalin is noted to have attended a performance of &lt;em&gt;Lady Macbeth of the Mtsensk District &lt;\/em&gt;at the Bolshoy Theater on January 26, two days before \u201cMuddle Instead of Music\u201d was distributed (Fay 2000, 84\u201385).'><sup>4<\/sup><\/a><\/span> In the two years following his denunciation by Andre\u012d Aleksandrovich Zhdanov in 1948, Shostakovich severely shifted his compositional ideology in response to his endangered career; this shift has not been discussed to the same extent as his first Marxist transition in 1936. Richard Taruskin acknowledges the Twenty-Four Preludes and Fugues as being a product of Shostakovich looking back through time for a form of stylistic neutrality to remedy his \u201cformalism\u201d\u2014a pill to purge Stalinism. He states, \u201cShostakovich\u2019s imagined Bach was a consoling pastor who could lead him beside the still waters and restore his soul. Buffeted by the world in its games of power as no mere composer had ever been, Shostakovich was desperately seeking a neutral corner\u201d (Taruskin 2008, 332).<\/p>\n\n\n\n<p>The Twenty-Four Preludes and Fugues exemplify Baroque practices of prelude and fugal composition, including tonal and contrapuntal idioms that generate harmonic states or motion toward tonal goals. Like Fr\u00e9d\u00e9ric Chopin\u2019s 24 Preludes, op. 28 (1839), these pieces traverse all major and minor keys and stylistically emulate Bach\u2019s <em>WTC<\/em>.<span id='easy-footnote-5-9747' class='easy-footnote-margin-adjust'><\/span><span class='easy-footnote'><a href='https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/#easy-footnote-bottom-5-9747' title='While Bach orders his preludes and fugues chromatically, first major, then minor, with each new tonic raised a half step from the previous tonic, Chopin and Shostakovich order theirs according to the circle of fifths (major, relative minor, then the next major key on the circle of fifths, its relative minor, etc.).'><sup>5<\/sup><\/a><\/span> Shostakovich\u2019s preludes and fugues often incorporate meta-compositional references that directly acknowledge features of specific pieces in the <em>WTC<\/em>. Before examining larger musical contexts, it is important to establish how the Twenty-Four Preludes and Fugues confirms its association with the <em>WTC<\/em>.<\/p>\n\n\n\n<p>Intertextuality is a frequent technique featured in Shostakovich\u2019s music. While quotation and self-quotation have been studied in his symphonies and chamber works, more subtle references and musical impersonations of Bach take place in the Twenty-Four Preludes and Fugues. <strong>Examples 1a<\/strong> and <strong>1b<\/strong> illustrate several ways in which Shostakovich musically acknowledges preludes and fugues fromthe <em>WTC<\/em>. Example 1a presents the first measure from both Shostakovich\u2019s Prelude no. 1 in C major and Bach\u2019s Prelude in C major from Book I.<\/p>\n\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-1a\/\"><img loading=\"lazy\" decoding=\"async\" width=\"2040\" height=\"490\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-1a.png\" alt=\"Hofelich, Example 1a\" class=\"wp-image-9845\" style=\"width:512px\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-1a.png 2040w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-1a-300x72.png 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-1a-1024x246.png 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-1a-768x184.png 768w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-1a-1536x369.png 1536w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><em><b>Example 1a.<\/b> Shostakovich and Bach, Preludes no. 1 in C major. Chord-voicing association.<\/em><\/figcaption><\/figure>\n<\/div>\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-1b\/\"><img loading=\"lazy\" decoding=\"async\" width=\"1524\" height=\"636\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-1b.jpg\" alt=\"Hofelich, Example 1b\" class=\"wp-image-9846\" style=\"width:512px\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-1b.jpg 1524w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-1b-300x125.jpg 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-1b-1024x427.jpg 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-1b-768x321.jpg 768w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><em><strong>Example 1b<\/strong>. Shostakovich, Prelude no. 4 and Bach, Fugues from WTC. Associations between opening rhythmic gestures.<\/em><\/figcaption><\/figure>\n<\/div>\n\n\n<p>Taruskin observes that Shostakovich\u2019s first prelude \u201cinvokes the Bachian muse, as if seeking its protection: a gentle sarabande, it begins with a chord made up of exactly the same notes that Bach had presented as an arpeggio in <em>his <\/em>opening prelude\u201d (Taruskin 2008, 332). Lyn Henderson observes further connections to Baroque practice in Shostakovich\u2019s preludes and fugues. She writes,<\/p>\n\n\n\n<blockquote class=\"wp-block-quote is-layout-flow wp-block-quote-is-layout-flow\">\n<p>The music, though rarely approaching pastiche, shows a felicitous response to eighteenth-century models. The B minor prelude\u2019s heavily dotted rhythms, for example, suggest the French overture and Bach\u2019s citing of it in his D major fugue. The C$$\\sharp$$ minor prelude recalls Bach\u2019s E$$\\flat$$ major prelude in its busy thematic patterning. The standard dance movements of the baroque suite prompted a variety of stylisations, notably the C major and F major preludes, echoing the rhythm of the sarabande, the D and D$$\\flat$$major preludes, suggesting the minuet, and the B major prelude evoking the gavotte. In several examples, fugal discipline would appear to have fostered a corresponding restraint of harmonic idiom, as in the white-note idiom of the B$$\\flat$$ minor fugue. Other examples include the strongly tonal subject and diatonic working-out, with canon, of the E major fugue, the gigue-like G major fugue, and the fugue in E$$\\flat$$ minor, which submits unconditionally to the demands of baroque syntax. (Henderson 2000, 55)<\/p>\n<\/blockquote>\n\n\n\n<p>Example 1b suggests additional rhythmic correlations between the opening of Shostakovich\u2019s Prelude no. 4 in E minor and four fugues from the <em>WTC<\/em>. The bracketed rhythmic articulations in the first measure of Shostakovich\u2019s E-minor prelude and the beginning of subjects in Bach\u2019s fugues (D$$\\sharp$$ minor from Book II, D major from Book II, B minor from Book I, and F$$\\sharp$$ minor from Book II) convey similar rhythmic gestures, where a succession of shorter note values is followed by a longer gesture (a quarter note or two short notes slurred together). Shostakovich\u2019s musical connections to Bach and the Baroque style confirm that the op. 87 preludes are rooted in customary frameworks.<\/p>\n\n\n\n<p>In addition to associations with the Baroque style,the op. 87 preludes enable further access points for linear analysis through Shostakovich\u2019s use of hexatonic progressions that function as chromatic analogues to more traditional prolongational idioms. Hexatonic relationships are commonplace in Shostakovich\u2019s music, producing triadic post-tonal harmonies that are related through motion between chromatic poles. A prominent example of these relationships can be observed in the opening measures of the second movement of String Quartet no. 9 in E$$\\flat$$ Major, op. 117 (1964). In mm. 1\u20135, parsimonious voice leading connects F$$\\sharp$$-minor triads (tonic) to B$$\\flat$$-major and C-major triads (see <strong>Example 2<\/strong>).<\/p>\n\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-2\/\"><img loading=\"lazy\" decoding=\"async\" width=\"2110\" height=\"1015\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-2.jpg\" alt=\"Hofelich, Example 2\" class=\"wp-image-9877\" style=\"width:512px;height:auto\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-2.jpg 2110w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-2-300x144.jpg 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-2-1024x493.jpg 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-2-768x369.jpg 768w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-2-1536x739.jpg 1536w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-2-2048x985.jpg 2048w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><em><strong>Example 2<\/strong>. Shostakovich, String Quartet no. 9, II, mm. 1\u20135.<\/em><\/figcaption><\/figure>\n<\/div>\n\n\n<p>Although neighboring or passing motions via chromatic poles have not been widely explored as expressing functional states in Shostakovich\u2019s music, Schenker\u2019s theory places no limit on the degree of chromaticism in tonal contexts.<span id='easy-footnote-6-9747' class='easy-footnote-margin-adjust'><\/span><span class='easy-footnote'><a href='https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/#easy-footnote-bottom-6-9747' title='In the music of Francis Poulenc, David Heetderks (2015) discusses the passing and neighboring functions of hexatonic poles and their role within broader progressions that lead to cadences. His functional models can contextualize progressions in Shostakovich\u2019s music, including an authentic cadence produced by i\u2013HxP\u2013V\u2013i. Cohn (2004, 303\u2013305) also analyzes hexatonic third-progressions in works by other composers as resulting through mixture processes.'><sup>6<\/sup><\/a><\/span> He explains, \u201cA firmly established tonality can guide even a large number of chromatic phenomena securely back into the basic triad\u201d (Schenker 1977, xxiii). Furthermore, hexatonic and tritone poles in this movement are generated from the chromatic lowering of the F$$\\sharp$$-minor scale and do not obscure the movement\u2019s monotonality at the surface level.<\/p>\n\n\n\n<p>Measures 1\u20134 present six notes, each of which belongs either to the F$$\\sharp$$-minor or B$$\\flat$$-major triad (not counting the G$$\\sharp$$ in the viola melody in m. 2, which neighbors A). These pitches form a hexatonic set of major and minor triads: F$$\\sharp$$-, F$$\\sharp$$+, B$$\\flat$$-, B$$\\flat$$+, D-, and D+. In the hexatonic cycle, navigation from F$$\\sharp$$ minor to B$$\\flat$$ major is facilitated by neo-Riemannian transformation H (also understood as PLP or LPL), as shown in <strong>Example 3<\/strong>.<span id='easy-footnote-7-9747' class='easy-footnote-margin-adjust'><\/span><span class='easy-footnote'><a href='https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/#easy-footnote-bottom-7-9747' title='Triads related by major thirds and tritones are more closely related in chromatic space when measured by the semitone movements required to complete a transformation, whereas distances measured by root motion (on the circle of fifths) require more steps.'><sup>7<\/sup><\/a><\/span> H transformations divide hexatonic space symmetrically and produce neighboring motions, but these progressions have not been explored as prolonging harmonic states in Shostakovich\u2019s music.<\/p>\n\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-3\/\"><img loading=\"lazy\" decoding=\"async\" width=\"1819\" height=\"417\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-3.png\" alt=\"Hofelich, Example 3\" class=\"wp-image-9847\" style=\"width:512px\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-3.png 1819w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-3-300x69.png 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-3-1024x235.png 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-3-768x176.png 768w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-3-1536x352.png 1536w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><em><strong>Example 3. <\/strong>Shostakovich, String Quartet no. 9, II. Hexatonic pole transformations in mm. 1\u20134.<\/em><\/figcaption><\/figure>\n<\/div>\n\n\n<p>Example 3 proposes that F$$\\sharp$$ minor is expanded by its hexatonic pole through neo-Riemannian transformations. The extension of F$$\\sharp$$ minor across mm. 1\u20134 is produced by semitone voice leading in hexatonic space analogous to a contrapuntal $$\\hat{5}$$\u2013$$\\hat{6}$$\u2013$$\\hat{5}$$ above tonic. In addition to the $$\\hat{5}$$\u2013$$\\hat{6}$$\u2013$$\\hat{5}$$ motion in the upper voice, every voice moves by one semitone to form the B$$\\flat$$-major triad.<\/p>\n\n\n\n<p>In tonal music, prolongation via $$\\hat{5}$$\u2013$$\\hat{6}$$\u2013$$\\hat{5}$$ typically preserves at least one common tone between chords. While no common tones are shared between the chords in mm. 1\u20134, the $$\\hat{5}$$\u2013$$\\hat{6}$$\u2013$$\\hat{5}$$ idiom is present in the second violin (C$$\\sharp$$\u2013D\u2013C$$\\sharp$$). The progressions in <strong>Example 4a<\/strong> illustrate comparable diatonic neighboring motions, suggesting that the B$$\\flat$$-major triad is a chromatically altered version of a neighboring chord or a voice-leading chord. The progression with vii$$^{\\circ}$$<sup>7<\/sup> serves as an alternative point for comparison, as it provides a more inclusive illustration of the pitches used in mm. 1\u20134 (D, and F$$\\natural$$ as <nobr>E$$\\sharp$$<\/nobr>) and how the outer voices move outward by half-step motion.<span id='easy-footnote-8-9747' class='easy-footnote-margin-adjust'><\/span><span class='easy-footnote'><a href='https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/#easy-footnote-bottom-8-9747' title='It is not uncommon even in late nineteenth-century music to observe similar alterations of the vii$$^{\\circ}$$&lt;sup&gt;7&lt;\/sup&gt; chord, in which a portion of the chord is present (sometimes enharmonically) but other members are chromatically shifted.'><sup>8<\/sup><\/a><\/span>\n\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-4a\/\"><img loading=\"lazy\" decoding=\"async\" width=\"1627\" height=\"354\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-4a.jpg\" alt=\"Hofelich, Example 4a\" class=\"wp-image-9848\" style=\"width:512px\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-4a.jpg 1627w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-4a-300x65.jpg 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-4a-1024x223.jpg 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-4a-768x167.jpg 768w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-4a-1536x334.jpg 1536w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><strong>Example 4a. <\/strong>Voice-leading analogues to the H transformation (- to +).<\/figcaption><\/figure>\n<\/div>\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-4b\/\"><img loading=\"lazy\" decoding=\"async\" width=\"1128\" height=\"309\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-4b.png\" alt=\"Hofelich, Example 4b\" class=\"wp-image-9849\" style=\"width:512px\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-4b.png 1128w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-4b-300x82.png 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-4b-1024x281.png 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-4b-768x210.png 768w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><em><strong>Example 4b. <\/strong>Generating a B$$\\flat$$-major triad in the context of F$$\\sharp$$ minor through double mixture.<\/em><\/figcaption><\/figure>\n<\/div>\n\n\n<p class=\"has-text-align-left\">Alternatively, <strong>Example 4b<\/strong> demonstrates how <nobr>B$$\\flat$$ majorB$$\\flat$$<\/nobr> major reflects authentic stepwise motion in the contrapuntal idiom $$\\hat{5}$$\u2013$$\\hat{6}$$\u2013$$\\hat{5}$$ (C$$\\sharp$$\u2013D\u2013C$$\\sharp$$). Though it is aurally irrelevant, C$$\\sharp$$\u2013D\u2013C$$\\sharp$$ better expresses the stepwise nature of the counterpoint in question, whereas C$$\\sharp$$\u2013C\ud834\udd2a\u2013C$$\\sharp$$ does not effectively communicate a neighboring gesture.[\/note] Though F$$\\sharp$$ minor and B$$\\flat$$ major appear to be harmonically independent of one another, the combination of double mixture and the contrapuntal $$\\hat{5}$$\u2013$$\\hat{6}$$\u2013$$\\hat{5}$$ in mm. 1\u20134 effectively prolongs F$$\\sharp$$ minor as a harmonic state.<span id='easy-footnote-9-9747' class='easy-footnote-margin-adjust'><\/span><span class='easy-footnote'><a href='https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/#easy-footnote-bottom-9-9747' title='Yosef Goldenberg (2007, 60) provides a helpful table comparing Schenkerian and neo-Riemannian interpretations of diatonic and chromatic progressions where chordal roots are related by thirds, summarizing their interpretations through the processes of mixture or transformational operations.'><sup>9<\/sup><\/a><\/span>\n\n\n\n<p>While double mixture contextualizes B$$\\flat$$ major as an enharmonic chromatic mediant that produces the $$\\hat{5}$$\u2013$$\\hat{6}$$\u2013$$\\hat{5}$$ idiom, further examination of the pitches in mm. 1\u20134 reveals one of Alexander Dolzhansky\u2019s scalar variants. Pitches F$$\\sharp$$\u2013G$$\\sharp$$\u2013A\u2013B$$\\flat$$\u2013C$$\\sharp$$\u2013D\u2013(E)\u2013F$$\\natural$$ form the double-lowered Aeolian scale, one of the most common modally derived scales in Shostakovich\u2019s music.<span id='easy-footnote-10-9747' class='easy-footnote-margin-adjust'><\/span><span class='easy-footnote'><a href='https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/#easy-footnote-bottom-10-9747' title='Dolzhansky\u2019s modally derived scales result from the lowering of diatonic collections. He determined that Shostakovich\u2019s modal language was based on the lowering of intervals from medieval modes, producing both entire scales and fragments of scales constructed on the alteration and blending of traditional modal materials. Dolzhansky explores how the technique of modal lowering forms double-lowered Phrygian and double-lowered Aeolian collections in Shostakovich\u2019s music (Carpenter 1995, 77).'><sup>10<\/sup><\/a><\/span> While E is absent from mm. 1\u20134, the most salient features of this scale are expressed in the viola\u2019s theme. The chromatic neighboring of G$$\\sharp$$ and B$$\\flat$$ around A articulates the scale\u2019s two adjacent half steps between $$\\hat{2}$$\u2013$$\\hat{3}$$ and $$\\hat{3}$$\u2013$$\\flat\\hat{4}$$ followed by a leap of an augmented second between $$\\flat\\hat{4}$$\u2013$$\\hat{5}$$. The lowered scale degrees generate triadic post-tonal harmonies such as B$$\\flat$$ major when $$\\flat\\hat{4}$$, $$\\hat{6}$$, and $$\\flat\\hat{8}$$ of the double-lowered Aeolian scale vertically converge.<span id='easy-footnote-11-9747' class='easy-footnote-margin-adjust'><\/span><span class='easy-footnote'><a href='https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/#easy-footnote-bottom-11-9747' title='Ewell (2019, 2020) expands further on nineteenth- and twentieth-century Russian concepts of modality, tonality, and function.'><sup>11<\/sup><\/a><\/span>\n\n\n\n<p>Though this Russian modal scale accounts for chromatic activity that forms the $$\\hat{5}$$\u2013$$\\hat{6}$$\u2013$$\\hat{5}$$ idiom, it does not explain how the harmonic state of F$$\\sharp$$ minor occupies the space of mm. 1\u20134. The process of double mixture, however, describes how a chromatically altered mediant harmony both prolongs the tonic <em>Stufe <\/em>and establishes a contrapuntal idiom not usually associated with the mediant. In tonal music, harmonic motion between tonic and mediant tends to sound more like an expansion of tonic than a progression of two harmonies. While III can function as a tonic substitute or expansion, it generally does not participate in the progression i\u2013III\u2013i in the manner of prolongational idioms such as i\u2013V\u2013i or i\u2013iv\u2013i. When the tonic progresses to the mediant, the mediant is usually followed by a pre-dominant harmony that connects to V, completing the arpeggiation of the tonic triad. The mixture mediant $$\\sharp$$III, however, enharmonically contextualizes $$\\sharp\\hat{3}$$ and $$\\sharp\\hat{5}$$ as $$\\flat\\hat{4}$$ and $$\\hat{6}$$, operating within Shostakovich\u2019s modally lowered scale. Though the mediant is chromatically altered in this passage, the prolongational span of tonic is produced by the harmonic and contrapuntal activity of mm. 1\u20134. Schenker\u2019s theory explains that chromatic <em>Stufen<\/em> retain the functional behaviors of their diatonic counterpoints. He states,<\/p>\n\n\n\n<blockquote class=\"wp-block-quote is-layout-flow wp-block-quote-is-layout-flow\">\n<p>In its chromatic state, the <em>Stufe<\/em> proves itself to be the same spiritual and higher unity that we have already defined for the diatonic form; the obligation to return to the diatonic system does not imply any restrictions as far as the duration of the chromatic <em>Stufe<\/em> is concerned; its duration remains variable just like that of the diatonic <em>Stufe<\/em> and varies from a minimum to the greatest conceivable maximum. (Brown 1986, 14)<\/p>\n<\/blockquote>\n\n\n\n<p>In Schenker\u2019s system, all triads are effectively created from and are related to the tonic triad using harmonic principles, meaning that this system is <em>transformational<\/em>. Therefore, chromatic and modal inflections are also understood in relation to the tonal system or the tonic triad. Chromatic <em>Stufen <\/em>\u201cdo not elaborate or substitute for diatonic <em>Stufen<\/em>,\u201d but are \u201calternative ways of expressing the same harmonic state\u201d subject to the same types of prolongation as their diatonic counterparts (Brown 1986, 14). Additionally, Schenker did not distinguish between classical diatonic tonality and nineteenth-century chromatic tonality when developing his tonal system. He \u201cconceived of one and <em>only<\/em> one system of tonal relations\u201d (Brown 1986, 14).<\/p>\n\n\n\n<p>Triadic post-tonality in Shostakovich\u2019s music not only expresses functionality through the processes of simple, secondary, and double mixture, but also through contrapuntal motions that expand harmonic states and form directed motion toward tonal goals.<span id='easy-footnote-12-9747' class='easy-footnote-margin-adjust'><\/span><span class='easy-footnote'><a href='https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/#easy-footnote-bottom-12-9747' title='An alternative approach to voice leading in Shostakovich\u2019s music could adopt Daniel Harrison\u2019s (2016, 82\u201388) curvilinear character types. Harrison\u2019s K-lines, H-lines, and S-lines (after Kurth, Hindemith, and Schenker) could explicate the directionality of various step progressions in highly chromatic passages without necessarily connecting every pitch to an underlying tonal structure. This approach would be especially valuable to Shostakovich\u2019s experimental works written between 1927\u20131936 that feature what Hugh Ottaway (1975) describes as \u201cnon-functional counterpoint.\u201d'><sup>12<\/sup><\/a><\/span> Contrapuntal processes have provided access points to prolongational techniques in a wide selection of post-tonal repertoire, including music composed by Shostakovich (Fanning 2010; Marlowe 2013), as well as concerns with post-tonal prolongation more generally (Baker 1990; Brown 1993; Bakulina 2015, 2018; Salzer 1952; Forrest 2010; Jackson 2024). These analyses exemplify how voice-leading methodologies approach and contextualize linear content in pieces that exhibit contrapuntal procedures analogous to canonic monotonal literature by twentieth-century composers. While post-tonal environments engender fewer functional relationships between harmonies or pitch-class sets, James Baker discloses how Schenkerian analysis illuminates aspects of structure in post-tonal music that other methodologies such as set theory or neo-Riemannian analysis cannot. Like Russian modal theories, set theory and other transformational approaches elucidate surface tendencies in chromatic music, but do not typically address large-scale organization.<span id='easy-footnote-13-9747' class='easy-footnote-margin-adjust'><\/span><span class='easy-footnote'><a href='https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/#easy-footnote-bottom-13-9747' title='This statement applies primarily to post-tonal works that feature linear counterpoint amenable to prolongational, transformational, and Russian modal-scalar approaches. For examples of analytical models that demonstrate the complementary relationship between Schenkerian and neo-Riemannian methodologies in common-practice music (the late music of Franz Schubert), see Ren\u00e9 Rusch (2012\u201313).'><sup>13<\/sup><\/a><\/span> Prolongational tools, however, can display how post-tonal music expresses different states of linearity at multiple levels of structure without forcing the music into standard tonal models. Prolongational techniques also shed light on how twentieth-century works produce long-range structure and motivic confirmation.<span id='easy-footnote-14-9747' class='easy-footnote-margin-adjust'><\/span><span class='easy-footnote'><a href='https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/#easy-footnote-bottom-14-9747' title='Motivic confirmation describes both the operation and saturation of surface-level motives, figures, or linear gestures within deeper levels of musical structure.'><sup>14<\/sup><\/a><\/span> When considering linear approaches to post-tonal works, Baker advises, \u201cIt is my conviction that the important question concerning a composition on the borderline between tonality and atonality is <em>not<\/em>: Is it tonal or atonal? Rather, one must ask: In what way is this piece tonal?\u201d (1990, 168). Though Baker does not advocate for prolongational analysis as a primary methodology, he asserts that Schenker\u2019s theory can be a useful component in a comprehensive approach to twentieth-century music.<\/p>\n\n\n\n<p>An analytical thread between studies by Sarah Marlowe, David Fanning, James Baker, Matthew Brown, and Felix Salzer illustrates how linear counterpoint produces harmonic states in post-tonal music, albeit in less functional manners than in common-practice works. Voice exchanges, for example, can establish a harmonic state sustained via passing tones. While the prolongation of a set class is problematic yet conceptually valid in Baker\u2019s view, harmonic states in Shostakovich\u2019s music are produced through contrapuntal techniques analogous to music in the Bach-to-Brahms canon (Fanning 2010, 78\u201379). Fanning (1989, 1995, 2010) has written voluminously on the music of Shostakovich and how linear progressions generate the processive forces behind harmonic and motivic development in the symphonies. Marlowe (2013, 103\u2013188), similarly, explores Schenkerian applications to fugues from the Twenty-Four Preludes and Fugues, op. 87 and addresses interactions between Schenkerian theory and Russian modal theory. Her work, perhaps the most extensive answer to Ellon Carpenter\u2019s call for all-inclusive approaches to Shostakovich\u2019s music, engages with the foreground and middleground structures of Fugue nos. 22 and 23.<span id='easy-footnote-15-9747' class='easy-footnote-margin-adjust'><\/span><span class='easy-footnote'><a href='https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/#easy-footnote-bottom-15-9747' title='In her chapter on Russian theoretical approaches to Shostakovich\u2019s music, Ellon Carpenter (1995, 112) writes that Russian modal theories have not focused on large-scale structures in Shostakovich\u2019s music, calling for studies that penetrate beyond the musical surface and establish modal and tonal frameworks for entire pieces.'><sup>15<\/sup><\/a><\/span> Marlowe\u2019s study underscores the ability of Schenker\u2019s theory to accommodate Shostakovich\u2019s surface chromaticism and addresses a significant gap in linear approaches to his music for solo piano. This study expands on the work of Fanning and Marlowe, answering Carpenter\u2019s call for large-scale processive analyses of Shostakovich\u2019s music. The following analyses investigate Shostakovich\u2019s reconstructed expressions of tonality in the op. 87 preludes and explore his rhetorical associations with Bach\u2019s <em>WTC<\/em>.<\/p>\n\n\n\n<h2 class=\"wp-block-heading\"><strong>2. Prelude No. 4 in E Minor, Op. 87<\/strong><\/h2>\n\n\n\n<p>A linear approach to the op. 87 preludes addresses prominent long-range connections and elements of their tonal architecture. Each prelude examined in this study features two cycles of thematic material, post-tonal analogues to prolongational gestures, and motivic confirmation. Prelude no. 4, like preludes in the <em>WTC<\/em>, presents two cycles of thematic material before its structural closure (see <strong>Example 5<\/strong>). The second cycle chromatically elaborates on diatonic material in the first cycle, typical of both Baroque preludes and other Baroque styles and dances (Lester 1999, 128). The prelude also incorporates a descending-fourth motive ($$\\hat{1}$$\u2013$$\\hat{7}$$\u2013$$\\hat{6}$$\u2013\u00ad$$\\hat{5}$$); this motive saturates the prelude\u2019s foreground and middleground structures and prefigures a global harmonic progression that unfolds over both cycles. The modal lowering of the descending fourth in the second cycle chromatically displaces contrapuntal motions of previous diatonic passages.<\/p>\n\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-5\/\"><img loading=\"lazy\" decoding=\"async\" width=\"2560\" height=\"296\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-5.png\" alt=\"Hofelich, Example 5\" class=\"wp-image-9850\" style=\"width:512px\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-5.png 2560w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-5-300x35.png 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-5-1024x118.png 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-5-768x89.png 768w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-5-1536x178.png 1536w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-5-2048x237.png 2048w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><em><strong>Example 5.<\/strong> Shostakovich, Prelude in E minor, op. 87, no. 4. Cyclic structure.<\/em><\/figcaption><\/figure>\n<\/div>\n\n\n<p><strong>Example 6<\/strong> illustrates two stepwise descents outlining a fourth in mm. 1\u20137. The melody presents the descending fourth directly in mm. 3\u20134, and a broader version descends in an inner voice in mm. 1\u20135. The registral transfer of the inner voice from C<sub>4<\/sub>\u2013C<sub>3<\/sub> enables it to complete its descent from E<sub>4<\/sub> in the bass register in mm. 3\u20134. Without considering registral transfer, the inner voice on C<sub>4<\/sub> in m. 3 appears to vanish in m. 4. This interpretation traces the stepwise continuity of each voice from the falling thirds in the upper voice in mm. 1\u20132 to the overarching fourth motion in the inner voice. At a deeper level, each cycle exhibits a large-scale octave descent in the melody starting on different scale degrees ($$\\hat{3}$$ in the first cycle followed by $$\\hat{2}$$ in the second). Octave descents are characteristic of Baroque preludes when the bass steps downward from $$\\hat{1}$$ to $$\\hat{5}$$, then descends to $$\\hat{1}$$ again, completing a scale within the first cycle.<\/p>\n\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-6\/\"><img loading=\"lazy\" decoding=\"async\" width=\"2157\" height=\"1644\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-6.jpg\" alt=\"Hofelich, Example 6\" class=\"wp-image-9851\" style=\"width:512px\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-6.jpg 2157w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-6-300x229.jpg 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-6-1024x780.jpg 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-6-768x585.jpg 768w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-6-1536x1171.jpg 1536w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-6-2048x1561.jpg 2048w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><em><strong>Example<\/strong> <strong>6.<\/strong> Shostakovich, Prelude no. 4, mm. 1\u20137. Descending-fourth motives.<\/em><\/figcaption><\/figure>\n<\/div>\n\n\n<p><strong>Example 7<\/strong> reproduces Schenker\u2019s sketches of the C-major and C-minor preludes from the <em>WTC<\/em>, Book I (Schenker 1977, 77, fig. 95e 3\u20134). In each sketch, the melody follows the bass line in parallel tenths, completing octave descents within their first cycles.<\/p>\n\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-7\/\"><img loading=\"lazy\" decoding=\"async\" width=\"1861\" height=\"620\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-7.jpg\" alt=\"Hofelich, Example 7\" class=\"wp-image-9852\" style=\"width:512px\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-7.jpg 1861w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-7-300x100.jpg 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-7-1024x341.jpg 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-7-768x256.jpg 768w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-7-1536x512.jpg 1536w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><em><strong>Example 7.<\/strong> Sketches of Bach, Prelude nos. 1 and 2, WTC I. (Reproduced from Schenker 1977, 77, fig. 95e 3\u20134).<\/em><\/figcaption><\/figure>\n<\/div>\n\n\n<p>William Renwick (1995, 11\u201315) also observes octave descents in Bach\u2019s C-major, C-minor, D-major, and E-minor preludes from the <em>WTC<\/em>,Book I in his chapter on analyzing fugue, connecting the descents to Rule of the Octave patterns (see <strong>Examples 8a<\/strong> and <strong>8b<\/strong>). Similarly, I analyze the octave descents in the first cycle of Bach\u2019s E-minor prelude in <strong>Example 8c<\/strong>, illustrating the parallel tenths formed between the bass and melody that are rhythmically misaligned on the musical surface. <strong>Example 9<\/strong>, analogously, depicts how Shostakovich emulates the melodic octave descent in each cycle of Prelude no. 4 (Example 9 also preserves the descending fourths in the melody and inner voice). Resembling the linear pathways outlined in Examples 7, 8a, 8b, and 8c, the melody begins on $$\\hat{3}$$ and traverses an octave descent by step. The only structural difference between Shostakovich\u2019s prelude and Bach\u2019s is that the bass does not descend with the melody in parallel tenths.<\/p>\n\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-8a\/\"><img loading=\"lazy\" decoding=\"async\" width=\"1918\" height=\"652\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-8a.jpg\" alt=\"Hofelich, Example 8a\" class=\"wp-image-9853\" style=\"width:512px\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-8a.jpg 1918w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-8a-300x102.jpg 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-8a-1024x348.jpg 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-8a-768x261.jpg 768w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-8a-1536x522.jpg 1536w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><em><strong>Example 8a. <\/strong>Middleground analysis of Bach, Prelude no. 1 in C Major, WTC I (reproduced from Renwick 1995, 14).<\/em><\/figcaption><\/figure>\n<\/div>\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-8b\/\"><img loading=\"lazy\" decoding=\"async\" width=\"1882\" height=\"672\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-8b.jpg\" alt=\"Hofelich, Example 8b\" class=\"wp-image-9854\" style=\"width:512px\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-8b.jpg 1882w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-8b-300x107.jpg 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-8b-1024x366.jpg 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-8b-768x274.jpg 768w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-8b-1536x548.jpg 1536w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><em><strong>Example 8b.<\/strong> Middleground analysis of Bach, Prelude no. 2 in C Minor, WTC I (reproduced from Renwick 1995, 14).<\/em><\/figcaption><\/figure>\n<\/div>\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-8c\/\"><img loading=\"lazy\" decoding=\"async\" width=\"2002\" height=\"856\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-8c.jpg\" alt=\"Hofelich, Example 8c\" class=\"wp-image-9855\" style=\"width:512px\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-8c.jpg 2002w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-8c-300x128.jpg 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-8c-1024x438.jpg 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-8c-768x328.jpg 768w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-8c-1536x657.jpg 1536w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-8c-2000x856.jpg 2000w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><em><strong>Example 8c.<\/strong> Bach, Prelude no. 10 in E Minor, WTC I, mm. 1\u201311. Middleground analysis showing octave descents.<\/em><\/figcaption><\/figure>\n<\/div>\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-9\/\"><img loading=\"lazy\" decoding=\"async\" width=\"1527\" height=\"1029\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-9.jpg\" alt=\"Hofelich, Example 9\" class=\"wp-image-9856\" style=\"width:512px\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-9.jpg 1527w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-9-300x202.jpg 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-9-1024x690.jpg 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-9-768x518.jpg 768w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><em><strong>Example 9.<\/strong> Shostakovich, Prelude no. 4, mm. 1\u201320. Middleground analysis showing melodic octave descents.<\/em><\/figcaption><\/figure>\n<\/div>\n\n\n<p>Related to the structural cycles in preludes from the <em>WTC<\/em>, the cyclic divisions in Example 9 are determined by the conclusion of the first octave descent in m. 12 where the coupling of $$\\hat{3}$$ is executed. This coupling is a linear trait shared between the E-minor preludes of Shostakovich and Bach, where the octave transfer of G<sub>5<\/sub>\u2013G<sub>4<\/sub> is featured in their first cycles (compare mm. 1\u201312 of Example 9 with mm. 1\u201311 of Example 8c). The prolongational span formed by the octave descent reproduces a typical linear development in Baroque preludes; this serves as an access point for Schenkerian methodologies (Renwick 1995, 11\u201315). In the second cycle, the octave descent beginning on $$\\hat{2}$$ echoes the contrapuntal events of mm. 1\u201312 in D major. The middleground in Example 9 associates cycle one with melodic $$\\hat{3}$$ and cycle two with $$\\hat{2}$$, highlighting the large-scale tenths formed between the bass and melody at the start of each cycle (E\u2013G stepping down to D\u2013F$$\\sharp$$). The harmonic plane is further lowered in m. 23 when the D in the bass slips to D$$\\flat$$, chromatically displacing the previous D-major passage into a region of D$$\\flat$$ major (see Example 10). A contrapuntal D\u2013F<sup>6<\/sup> in mm. 13\u201317 prefigures the chromatic displacement with $$\\flat\\hat{2}$$. This contrapuntal motion is repeated in an intensified and condensed version in mm. 23\u201325 (D$$\\flat$$\u2013F<sup>6<\/sup>) where the localized shadow tonality elicits a descending fourth that starts on E$$\\flat$$ instead of E$$\\natural$$ (in m. 26).<span id='easy-footnote-16-9747' class='easy-footnote-margin-adjust'><\/span><span class='easy-footnote'><a href='https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/#easy-footnote-bottom-16-9747' title='Chromatically displaced passages may also be described as projecting a metaphorical shadow tonality. For examples of other chromatically displaced passages in twentieth-century Russian works by Sergei Prokofiev, Dmitry Kabalevsky, and Shostakovich, see Richard Bass (1988).'><sup>16<\/sup><\/a><\/span> The modal lowering of the descending fourth as a reaction to the bass\u2019s $$\\flat\\hat{7}$$ produces a chromatic extension of the motive. At deeper levels of middleground structure, however, the shift to D$$\\flat$$ major in m. 23 is also symptomatic of motivic confirmation. <strong>Example 10<\/strong> demonstrates how the bass line in mm. 1\u201328 is a chromatic enlargement of the descending fourth, moving from E in the first cycle to D\u2013D$$\\flat$$\u2013C\u2013B in the second cycle. From a broader linear perspective, the bass-line shift to D$$\\flat$$ in m. 23 is observed as an instance of passing rather than a harmonic arrival point. A prolongational rendering of the prelude\u2019s harmonic structure by the descending fourth also contributes to a more organic and unified representation of the music.<\/p>\n\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-10\/\"><img loading=\"lazy\" decoding=\"async\" width=\"2219\" height=\"1021\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-10.jpg\" alt=\"Hofelich, Example 10\" class=\"wp-image-9857\" style=\"width:512px\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-10.jpg 2219w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-10-300x138.jpg 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-10-1024x471.jpg 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-10-768x353.jpg 768w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-10-1536x707.jpg 1536w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-10-2048x942.jpg 2048w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><em><strong>Example 10.<\/strong> Shostakovich, Prelude no. 4, mm. 1\u201329. Middleground.<\/em><\/figcaption><\/figure>\n<\/div>\n\n\n<p>Retaining lowered elements from the chromatic displacement at m. 23, the closing section of cycle two (mm. 30\u201338) presents a functional complication when shifting from E minor to A$$\\flat$$ major in mm. 30\u201331 (see <strong>Example 11<\/strong>). These key areas represent a hexatonic relationship generated by double mixture and deeper contrapuntal processes. A transformational interpretation of this chromatic shift in <strong>Example 12<\/strong> also illustrates how each member of the initial minor triad moves one semitone to produce its hexatonic pole.<\/p>\n\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-11\/\"><img loading=\"lazy\" decoding=\"async\" width=\"2152\" height=\"1396\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-11.jpg\" alt=\"Hofelich, Example 11\" class=\"wp-image-9858\" style=\"width:512px\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-11.jpg 2152w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-11-300x195.jpg 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-11-1024x664.jpg 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-11-768x498.jpg 768w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-11-1536x996.jpg 1536w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-11-2048x1329.jpg 2048w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><em><strong>Example 11. <\/strong>Shostakovich, Prelude no. 4, mm. 30\u201338.<\/em><\/figcaption><\/figure>\n<\/div>\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-12\/\"><img loading=\"lazy\" decoding=\"async\" width=\"1977\" height=\"416\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-12.png\" alt=\"Hofelich, Example 12\" class=\"wp-image-9859\" style=\"width:512px\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-12.png 1977w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-12-300x63.png 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-12-1024x215.png 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-12-768x162.png 768w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-12-1536x323.png 1536w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><em><strong>Example 12.<\/strong> Hexatonic pole transformation of E minor to A$$\\flat$$ major.<\/em><\/figcaption><\/figure>\n<\/div>\n\n\n<p>Studies of transformational expansions have contextualized chromatic passages within broader tonal fields. The progression from i to $$\\sharp$$III in m. 31 functions in a similar way to progressions that feature hexatonic poles in Francis Poulenc\u2019s music. David Heetderks (2015, 182\u2013185) notes that $$\\sharp$$III forms a hexatonic relationship with a minor tonic in Poulenc\u2019s mature music and can be positioned within a phrase that leads toward an authentic cadence (i\u2013$$\\sharp$$III [HxP]\u2013V<sup>7<\/sup>\u2013i).<span id='easy-footnote-17-9747' class='easy-footnote-margin-adjust'><\/span><span class='easy-footnote'><a href='https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/#easy-footnote-bottom-17-9747' title='HxP is an abbreviation for hexatonic pole.'><sup>17<\/sup><\/a><\/span> In mm. 29\u201336 of Shostakovich\u2019s Prelude no. 4, the modal lowering of the melodic descending fourth (E\u2013E$$\\flat$$) and the harmonic shift from i\u2013$$\\sharp$$III (enharmonic) that supports it initiate a progression with a trajectory toward the dominant. <strong>Example 13<\/strong> clarifies that a final chromatic extension of the descending fourth in m. 29 invites an extended hexatonic region when the melodic E is lowered to E$$\\flat$$.<\/p>\n\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-13\/\"><img loading=\"lazy\" decoding=\"async\" width=\"2560\" height=\"1084\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-13.jpg\" alt=\"Hofelich, Example 13\" class=\"wp-image-9860\" style=\"width:512px\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-13.jpg 2560w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-13-300x127.jpg 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-13-1024x434.jpg 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-13-768x325.jpg 768w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-13-1536x650.jpg 1536w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-13-2048x867.jpg 2048w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><em><strong>Example 13. <\/strong>Shostakovich, Prelude no. 4, mm. 1\u201338. Middleground.<\/em><\/figcaption><\/figure>\n<\/div>\n\n\n<p>The final cadence at m. 38 (and the following coda) seizes $$\\hat{3}$$ as the structural melodic tone (see Example 13). In parentheses, melodic half steps G\u2013F$$\\sharp$$\u2013F$$\\natural$$\u2013E project the vestige of an <em>Urlinie<\/em> in mm. 1\u201329, but this descent does not exemplify the highest degree of linear movement; rather, it designates middleground motion into an inner voice. At deeper levels, $$\\hat{3}$$ is coupled over the span of mm. 1\u201338, retaining a static, or frozen, <em>Urlinie<\/em>.<span id='easy-footnote-18-9747' class='easy-footnote-margin-adjust'><\/span><span class='easy-footnote'><a href='https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/#easy-footnote-bottom-18-9747' title='The coupling of $$\\hat{3}$$ in mm. 1\u201338 is a structural augmentation of the salient surface-level octave descents associated with the Baroque prelude style.'><sup>18<\/sup><\/a><\/span> In m. 37, $$\\hat{3}$$ is targeted by F$$\\sharp$$ and A$$\\flat$$ while the dominant is intensified by the lowering of its chordal seventh. The A$$\\flat$$s that pervade the following coda harmonically resonate with the previously displaced key areas, D$$\\flat$$ major and A$$\\flat$$ major. Example 13 illustrates how $$\\hat{3}$$ is coupled over lowered harmonic areas that support the chromatic variants of the octave descent and the parenthetical <em>Urlinie<\/em>. Although Prelude no. 4 explores distantly related harmonic areas at local levels, prolongational analysis expresses how each cycle contributes to the linear composing-out of the E-minor triad and imitates the techniques of preludes in the <em>WTC<\/em>. Shostakovich\u2019s motivic parallelisms also saturate several dimensions of musical structure and emulate the compositional resourcefulness of Baroque literature.<\/p>\n\n\n\n<h2 class=\"wp-block-heading\"><strong>3. Prelude No. 13 in F$$\\sharp$$ Major, Op. 87<\/strong><\/h2>\n\n\n\n<p>Perhaps the most customary linear designs in this study are featured in the following analysis of Prelude no. 13 in F$$\\sharp$$ major.<span id='easy-footnote-19-9747' class='easy-footnote-margin-adjust'><\/span><span class='easy-footnote'><a href='https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/#easy-footnote-bottom-19-9747' title='Prelude no. 13 is the only prelude of the three that exhibits a structural melodic progression to $$\\hat{1}$$. Nevertheless, chromatic lowering produces post-tonal dissonant effects at the surface level.'><sup>19<\/sup><\/a><\/span> As in Prelude no. 4, the second cycle of Prelude no. 13 chromatically lowers diatonic material from the first cycle. Shostakovich begins his second set of preludes and fugues by ruminating on a pastoral melody (see <strong>Example 15<\/strong>); however, the lowering of $$\\hat{2}$$, $$\\hat{3}$$, $$\\hat{5}$$, and $$\\hat{7}$$ in the second cycle distorts the nostalgic aesthetic established in mm. 1\u201312.<span id='easy-footnote-20-9747' class='easy-footnote-margin-adjust'><\/span><span class='easy-footnote'><a href='https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/#easy-footnote-bottom-20-9747' title='If this opening gesture were orchestrated, it is conceivable that the pastoral-sounding melody would be performed by a flute or oboe, similar to Frederick Delius\u2019s &lt;em&gt;Florida Suite&lt;\/em&gt;, \u201cDaybreak,\u201d or Edvard Grieg\u2019s \u201cMorning Mood\u201d from &lt;em&gt;Peer Gynt&lt;\/em&gt;.'><sup>20<\/sup><\/a><\/span>\n\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-14\/\"><img loading=\"lazy\" decoding=\"async\" width=\"2560\" height=\"301\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-14.png\" alt=\"Hofelich, Example 14\" class=\"wp-image-9861\" style=\"width:512px\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-14.png 2560w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-14-300x35.png 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-14-1024x120.png 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-14-768x90.png 768w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-14-1536x181.png 1536w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-14-2048x241.png 2048w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><em><strong>Example 14. <\/strong>Shostakovich, Prelude in F$$\\sharp$$ major, op. 87, no. 13. Cyclic structure.<\/em><\/figcaption><\/figure>\n<\/div>\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-15\/\"><img loading=\"lazy\" decoding=\"async\" width=\"2033\" height=\"765\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-15.jpg\" alt=\"Hofelich, Example 15\" class=\"wp-image-9862\" style=\"width:512px\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-15.jpg 2033w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-15-300x113.jpg 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-15-1024x385.jpg 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-15-768x289.jpg 768w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-15-1536x578.jpg 1536w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><strong>Example 15.<\/strong> Shostakovich, Prelude no. 13, m<em>m. 1\u20133.<\/em><\/figcaption><\/figure>\n<\/div>\n\n\n<p><strong>Examples 16a<\/strong> and <strong>16b<\/strong> trace the structural melodic descent from $$\\hat{5}$$ and the fundamental bass line in mm. 1\u201339. Of the three preludes examined in this study, Prelude no. 13 exhibits the most orthodox expressions of tonal closure at the conclusion of its cycles. The ending of each cycle is pronounced by an authentic cadence and the melodic descent of a fifth (C$$\\sharp$$\u2013F$$\\sharp$$). In each melodic descent, $$\\hat{2}$$ appears in parentheses over the bass\u2019s $$\\hat{5}$$ in Examples 16a and 16b where different pitches substitute for G$$\\sharp$$<sub>4<\/sub> in the cadential formula.<\/p>\n\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-16a\/\"><img loading=\"lazy\" decoding=\"async\" width=\"2560\" height=\"1186\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-16a.jpg\" alt=\"Hofelich, Example 16a\" class=\"wp-image-9863\" style=\"width:512px\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-16a.jpg 2560w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-16a-300x139.jpg 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-16a-1024x474.jpg 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-16a-768x356.jpg 768w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-16a-1536x712.jpg 1536w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-16a-2048x949.jpg 2048w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><em><strong>Example 16a.<\/strong> Shostakovich, Prelude no. 13, mm. 1\u201339. Middleground.<\/em><\/figcaption><\/figure>\n<\/div>\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-16b\/\"><img loading=\"lazy\" decoding=\"async\" width=\"2560\" height=\"1071\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-16b.jpg\" alt=\"Hofelich, Example 16b\" class=\"wp-image-9864\" style=\"width:512px\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-16b.jpg 2560w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-16b-300x126.jpg 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-16b-1024x428.jpg 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-16b-768x321.jpg 768w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-16b-1536x643.jpg 1536w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-16b-2048x857.jpg 2048w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><em><strong>Example 16b. <\/strong>Shostakovich, Prelude no. 13, mm. 1\u201339. Deeper middleground.<\/em><\/figcaption><\/figure>\n<\/div>\n\n\n<p>The prominent \u00ad\u00ad$$\\hat{6}$$\u2013$$\\hat{5}$$ gesture in the opening theme ($$\\hat{6}$$ is marked with flags in Examples 16a and 16b) is the primary agent of the pastorale. It functions not only to animate the rhetorical nostalgia of the thematic voice, but it also serves as a progenitor of two structural events linked to the opening pastoral image. At the surface level, the \u00ad\u00ad$$\\hat{6}$$\u2013$$\\hat{5}$$ manifests as a dyad within the cadence of each cycle, generating a post-tonal dissonant effect in both pre-dominant- and dominant- functioning harmonies. <strong>Example 17a<\/strong> depicts the melody in mm. 1\u20132, and <strong>Examples 17b<\/strong> and <strong>17c<\/strong> show the two authentic cadences in mm. 12 and 39.<\/p>\n\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-17a\/\"><img loading=\"lazy\" decoding=\"async\" width=\"1982\" height=\"402\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-17a.png\" alt=\"Hofelich, Example 17a\" class=\"wp-image-9865\" style=\"width:512px\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-17a.png 1982w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-17a-300x61.png 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-17a-1024x208.png 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-17a-768x156.png 768w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-17a-1536x312.png 1536w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><em><strong>Example 17a.<\/strong> Shostakovich, Prelude no. 13, mm. 1\u20132. Opening $$\\hat{6}$$\u2013$$\\hat{5}$$ gesture.<\/em><\/figcaption><\/figure>\n<\/div>\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-17b\/\"><img loading=\"lazy\" decoding=\"async\" width=\"2023\" height=\"873\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-17b.jpg\" alt=\"Hofelich, Example 17b\" class=\"wp-image-9866\" style=\"width:512px\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-17b.jpg 2023w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-17b-300x129.jpg 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-17b-1024x442.jpg 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-17b-768x331.jpg 768w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-17b-1536x663.jpg 1536w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><em><strong>Example 17b.<\/strong> Shostakovich, Prelude no. 13, mm. 9\u201313. C$$\\sharp$$\u2013D$$\\sharp$$ dyad saturation.<\/em><\/figcaption><\/figure>\n<\/div>\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-17c\/\"><img loading=\"lazy\" decoding=\"async\" width=\"2004\" height=\"804\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-17c.jpg\" alt=\"Hofelich, Example 17c\" class=\"wp-image-9867\" style=\"width:512px\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-17c.jpg 2004w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-17c-300x120.jpg 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-17c-1024x411.jpg 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-17c-768x308.jpg 768w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-17c-1536x616.jpg 1536w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><em><strong>Example 17c.<\/strong> Shostakovich, Prelude no. 13, mm. 36\u201340. C$$\\sharp$$\u2013D$$\\sharp$$ dyad saturation.<\/em><\/figcaption><\/figure>\n<\/div>\n\n\n<p>The progressions in Examples 17b and 17c are saturated by the nostalgia dyad (C\u00ad\u00ad$$\\sharp$$\u2013D$$\\sharp$$). In m. 11, both the pre-dominant and dominant are intensified by pastoral imagery, whereas in m. 38 only the dominant is colored.<span id='easy-footnote-21-9747' class='easy-footnote-margin-adjust'><\/span><span class='easy-footnote'><a href='https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/#easy-footnote-bottom-21-9747' title='An alternative analysis of the harmonic progressions colored by the C\u00ad\u00ad$$\\sharp$$\u2013D$$\\sharp$$ dyad would include the D$$\\sharp$$ in the dominant harmony as a chordal ninth, reflecting an enriched harmony similar to those featured in the late-Romantic French and Spanish art songs of composers like Gabriel Faur\u00e9 and Fernando Obradors.'><sup>21<\/sup><\/a><\/span> It is also significant that the first cycle cadences rather apprehensively with a melodic leap from $$\\hat{1}$$ to $$\\hat{5}$$ and with a dominant that omits the leading tone. In mm. 38\u201339, however, the leading tone is included and the melodic fourth leap is reversed (C$$\\sharp$$\u2013F$$\\sharp$$) to achieve a stronger sense of harmonic closure in the second cycle. The energetic vectors of these leaps are represented by curved arrows in mm. 11\u201312 and 38\u201339.<\/p>\n\n\n\n<p>The second structural manifestation of the pastoral image integrates the $$\\hat{6}$$\u2013$$\\hat{5}$$ gesture into broader linear expansions. <strong>Example 18<\/strong> highlights the prominent descending fourth from F$$\\sharp$$\u2013C$$\\sharp$$ in the theme of mm. 1\u20132, illuminating how the harmonic state of F$$\\sharp$$ major is established through both stepwise and arpeggiating motions. It is important to note that the function of the Baroque prelude\u2019s exordium is to introduce and secure a key area through the composing-out of the tonic triad. In preludes from the <em>WTC<\/em>, tonic states are attained in the opening measures or throughout their first cycles.<span id='easy-footnote-22-9747' class='easy-footnote-margin-adjust'><\/span><span class='easy-footnote'><a href='https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/#easy-footnote-bottom-22-9747' title='The octave coupling of $$\\hat{3}$$ in a prelude\u2019s first cycle can both establish and reinforce a tonic state, for example, as shown in the analyses in Examples 7\u20139.'><sup>22<\/sup><\/a><\/span> As in Prelude no. 4, the descending fourth from $$\\hat{1}$$\u2013$$\\hat{5}$$ emerges within local and global levels of musical structure. <strong>Example 19<\/strong> tracks the middleground pathways of the descending fourth. Each cycle essentially composes out fourth motion in an inner voice before cadencing, thereby confirming the structural resemblance between cycles one and two.<\/p>\n\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-18\/\"><img loading=\"lazy\" decoding=\"async\" width=\"1973\" height=\"567\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-18.png\" alt=\"Hofelich, Example 18\" class=\"wp-image-9868\" style=\"width:512px\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-18.png 1973w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-18-300x86.png 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-18-1024x294.png 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-18-768x221.png 768w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-18-1536x441.png 1536w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><em><strong>Example 18.<\/strong> Shostakovich, Prelude no. 13, mm. 1\u20132. Melodic descending fourth and tonic arpeggiation.<\/em><\/figcaption><\/figure>\n<\/div>\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-19\/\"><img loading=\"lazy\" decoding=\"async\" width=\"2560\" height=\"1164\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-19.jpg\" alt=\"Hofelich, Example 19\" class=\"wp-image-9869\" style=\"width:512px\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-19.jpg 2560w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-19-300x136.jpg 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-19-1024x466.jpg 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-19-768x349.jpg 768w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-19-1536x698.jpg 1536w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-19-2048x931.jpg 2048w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><em><strong>Example 19.<\/strong> Shostakovich, Prelude no. 13, mm. 1\u201339. Middleground with descending fourths.<\/em><\/figcaption><\/figure>\n<\/div>\n\n\n<p>While the descending fourth is structurally linked to the prelude\u2019s cyclic spans, its most extensive elaboration is reserved for the coda (mm. 39\u201355). In mm. 45\u201346, Shostakovich presents a succession of major triads that are remotely related in the context of F$$\\sharp$$ major (see Example 20). Neo-Riemannian labels are shown in <strong>Example 20<\/strong> to contextualize harmonic shifts between F$$\\sharp$$-major, D-major, F-major, and A-major triads in chromatic space.<\/p>\n\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-20\/\"><img loading=\"lazy\" decoding=\"async\" width=\"2156\" height=\"1423\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-20.jpg\" alt=\"Hofelich, Example 20\" class=\"wp-image-9870\" style=\"width:512px\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-20.jpg 2156w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-20-300x198.jpg 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-20-1024x676.jpg 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-20-768x507.jpg 768w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-20-1536x1014.jpg 1536w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-20-2048x1352.jpg 2048w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><em><strong>Example 20.<\/strong> Shostakovich, Prelude no. 13, mm. 44\u201349. Transformational possibilities.<\/em><\/figcaption><\/figure>\n<\/div>\n\n\n<p>While the harmonic progression is amenable to transformational analysis, Example 21 reveals how the passage motivically nests the descending fourth in an inner voice (see the asterisk in Example 21). Like the lowered versions of the descending fourth in Prelude no. 4, the altered descent (F$$\\sharp$$\u2013F$$\\natural$$\u2013E$$\\natural$$\u2013D$$\\sharp$$\u2013C$$\\sharp$$) in mm. 45\u201347 generates post-tonal harmonies that are distantly related at the surface level. The chromatic version is significant in that it preserves the whole step between D$$\\sharp$$\u2013C$$\\sharp$$, the figurative symbol of the pastorale, amidst the triadic post-tonal variation of nearly every other scale degree in the passage. Beyond the chromatic turmoil of the surface, <strong>Example 21<\/strong> illustrates how middleground I\u2013IV\u2013I elaboration in mm. 44\u201349 conveys structural prolongation over the span of this passage (typical of standard codas), encapsulating the chromatic area within a broader tonal expanse.<span id='easy-footnote-23-9747' class='easy-footnote-margin-adjust'><\/span><span class='easy-footnote'><a href='https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/#easy-footnote-bottom-23-9747' title='Example 21 also clarifies the melodic registral gap in the right hand created between F$$\\sharp$$&lt;sub&gt;3&lt;\/sub&gt; and E$$\\sharp$$&lt;sub&gt;4&lt;\/sub&gt; in m. 47. The F$$\\sharp$$&lt;sub&gt;3&lt;\/sub&gt; belongs to an inner voice, whereas the E$$\\sharp$$&lt;sub&gt;4&lt;\/sub&gt; is part of a separate descending fourth in the upper voice.'><sup>23<\/sup><\/a><\/span> The descending fourths at the end of the coda are confirmed in multiple registers and achieve a valedictory appearance starting on F$$\\sharp$$<sub>6<\/sub> in m. 52. Motivic overlap with registral variety forms an organically saturated coda and a prelude that is structurally unified by both linear and vertical amplifications of the pastoral $$\\hat{6}$$\u2013$$\\hat{5}$$ theme.<\/p>\n\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-21\/\"><img loading=\"lazy\" decoding=\"async\" width=\"2006\" height=\"1056\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-21.jpg\" alt=\"Hofelich, Example 21\" class=\"wp-image-9871\" style=\"width:512px\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-21.jpg 2006w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-21-300x158.jpg 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-21-1024x539.jpg 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-21-768x404.jpg 768w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-21-1536x809.jpg 1536w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><em><strong>Example 21.<\/strong> Shostakovich, Prelude no. 13, mm. 44\u201349. Motivic nesting and confirmation of descending fourth.<\/em><\/figcaption><\/figure>\n<\/div>\n\n\n<h2 class=\"wp-block-heading\"><strong>4. Prelude No. 22 in G Minor, Op. 87<\/strong><\/h2>\n\n\n\n<p>As in Prelude nos. 4 and 13, the second cycle of Prelude no. 22 in G minor (m. 45) chromatically alters material from its first cycle and develops a linear motive that influences harmonic progressions (see <strong>Example 22<\/strong> for cyclic divisions of Prelude no. 22). Its first cycle, however, does not expand on diatonic harmonies but includes triadic post-tonal chords such as a chromatic submediant E$$\\flat$$ minor (mm. 5\u20137) and a hexatonic pole B major (mm. 16\u201319) when the G-minor tonic is not being sustained.<span id='easy-footnote-24-9747' class='easy-footnote-margin-adjust'><\/span><span class='easy-footnote'><a href='https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/#easy-footnote-bottom-24-9747' title='The relationship between G minor and B major can be defined in hexatonic space as an H transformation. B major effectively prolongs the tonic via neighboring motions similar to the hexatonic expansion of tonic in mm. 1\u20134 of String Quartet no. 9 (see Examples 2\u20134b). Alternatively, Harrison\u2019s (2016) H-lines could track the vectors of step-wise progressions in the inner and outer voices without hierarchical contextualization.'><sup>24<\/sup><\/a><\/span> This cycle is also more expansive than the initial cycles of Prelude nos. 4 and 13, as well as preludes in the <em>WTC<\/em>, spanning forty-four measures. While E$$\\flat$$-minor and B-major harmonies are distantly related to G minor and are produced through the lowering of the G-minor scale, they function as analogues to contrapuntal neighboring motions through the processes of secondary and double mixture.<\/p>\n\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-22\/\"><img loading=\"lazy\" decoding=\"async\" width=\"2157\" height=\"291\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-22.png\" alt=\"Hofelich, Example 22\" class=\"wp-image-9872\" style=\"width:512px\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-22.png 2157w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-22-300x40.png 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-22-1024x138.png 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-22-768x104.png 768w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-22-1536x207.png 1536w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-22-2048x276.png 2048w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><em><strong>Example 22.<\/strong> Shostakovich, Prelude in G minor, op. 87, no. 22. Cyclic divisions.<\/em><\/figcaption><\/figure>\n<\/div>\n\n\n<p><strong>Example 23<\/strong> summarizes the middleground of the first cycle (mm. 1\u201345). The enharmonic treatment of F$$\\sharp$$ in m. 3 and G$$\\flat$$ in m. 4 is maintained in both cycles, prolonging the G-minor tonic along with $$\\hat{5}$$\u2013$$\\hat{6}$$\u2013$$\\hat{5}$$ contrapuntal motions in an upper voice. In mm. 8\u201320, the figures interpret C-major and B-major triads as chromatic adjustments of a neighboring subdominant. What would have been a conventional tonal idiom (the subdominant prolonging tonic) incorporates triadic post-tonal harmonies\u2013\u2013C major introduces $$\\natural\\hat{6}$$ and the hexatonic pole B major lowers each pitch of that triad by one semitone.<span id='easy-footnote-25-9747' class='easy-footnote-margin-adjust'><\/span><span class='easy-footnote'><a href='https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/#easy-footnote-bottom-25-9747' title='B, D$$\\sharp$$, and F$$\\sharp$$ are enharmonically understood as C$$\\flat$$, E$$\\flat$$, and G$$\\flat$$ in the figures.'><sup>25<\/sup><\/a><\/span> Although its surface harmonies appear distantly related, Prelude no. 22 is immobile at deeper levels of structure. In mm. 20\u201345, the $$\\hat{5}$$\u2013$$\\hat{6}$$\u2013$$\\hat{5}$$ idiom is extended by a strain of linear chromaticism, and the independent motion of the upper voices is represented by the staggering of figures in Example 23. While the bass becomes more active starting in m. 35, its third-descent to C takes place within the broader expansion of tonic.<\/p>\n\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-23\/\"><img loading=\"lazy\" decoding=\"async\" width=\"1635\" height=\"921\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-23.jpg\" alt=\"Hofelich, Example 23\" class=\"wp-image-9873\" style=\"width:512px\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-23.jpg 1635w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-23-300x169.jpg 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-23-1024x577.jpg 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-23-768x433.jpg 768w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-23-1536x865.jpg 1536w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><em><strong>Example 23.<\/strong> Shostakovich, Prelude no. 22, mm. 1\u201345. Middleground of the first cycle.<\/em><\/figcaption><\/figure>\n<\/div>\n\n\n<p>It is only in the second cycle (mm. 45\u201384) that structural bass-line motion is observed (see <strong>Example 24<\/strong>). In m. 67, the bass\u2019s low arrival on D<sub>1<\/sub> places registral emphasis on a cadential six-four that avoids resolution to a dominant triad.<span id='easy-footnote-26-9747' class='easy-footnote-margin-adjust'><\/span><span class='easy-footnote'><a href='https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/#easy-footnote-bottom-26-9747' title='In m. 67, a rising scale in the left hand also overrides the expectation of the cadential six-four resolving to the dominant by passing through F$$\\natural$$.'><sup>26<\/sup><\/a><\/span> The middleground in <strong>Example 25 <\/strong>illustrates how the structural dominant in m. 67 does not persuade $$\\hat{3}$$ in the melody to descend to $$\\hat{2}$$. Instead, the bass and inner voices meander within the dominant region in search of a pathway back to tonic, shown in the figures in mm. 67\u201384. Without a departure from $$\\hat{3}$$ in the melody, the prelude expresses a static <em>Urlinie<\/em>.<\/p>\n\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-24\/\"><img loading=\"lazy\" decoding=\"async\" width=\"2160\" height=\"1113\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-24.jpg\" alt=\"Hofelich, Example 24\" class=\"wp-image-9874\" style=\"width:512px\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-24.jpg 2160w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-24-300x155.jpg 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-24-1024x528.jpg 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-24-768x396.jpg 768w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-24-1536x791.jpg 1536w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-24-2048x1055.jpg 2048w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><em><strong>Example 24. <\/strong>Shostakovich, Prelude no. 22, mm. 63\u201369.<\/em><\/figcaption><\/figure>\n<\/div>\n\n\n<p>Within the restricted middleground structure of each cycle, the upper voice traces a series of recurring chromatic threads comprised of B$$\\flat$$, C, and an enharmonic C$$\\flat$$ that participate in neighboring activity above the bass. In mm. 20\u201335, a rising chromatic line is initiated in an inner voice (marked with stems and <em>tenor<\/em> annotations in Example 25) that is then transferred to the upper voice in m. 33. Although the recurring line involves notes B$$\\flat$$, C, and C$$\\flat$$, the occurrence of A$$\\natural$$ at closer structural levels beckons the question of whether the BACH motif is covertly embedded into the prelude\u2019s chromatic framework. Examples 1a and 1b illustrated various ways that Shostakovich\u2019s Twenty-Four Preludes and Fugues incorporate features of preludes and fugues from the <em>WTC<\/em>, and Shostakovich was certainly no stranger to monograms, quotations, or intertextual references.<span id='easy-footnote-27-9747' class='easy-footnote-margin-adjust'><\/span><span class='easy-footnote'><a href='https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/#easy-footnote-bottom-27-9747' title='See Lyn Henderson\u2019s (2000, 55) observations of additional connections between Shostakovich\u2019s Twenty-Four Preludes and Fugues and Bach\u2019s &lt;em&gt;WTC&lt;\/em&gt;.'><sup>27<\/sup><\/a><\/span> While the chromatic neighbors in Example 25 are produced by the lowering of the G-minor scale, the BACH motif is rendered symptomatically at levels closer to the musical surface.<\/p>\n\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-25\/\"><img loading=\"lazy\" decoding=\"async\" width=\"2560\" height=\"1168\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-25.jpg\" alt=\"Hofelich, Example 25\" class=\"wp-image-9875\" style=\"width:512px\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-25.jpg 2560w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-25-300x137.jpg 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-25-1024x467.jpg 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-25-768x350.jpg 768w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-25-1536x701.jpg 1536w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-25-2048x934.jpg 2048w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><em><strong>Example 25.<\/strong> Shostakovich, Prelude no. 22, mm. 1\u201384. Middleground.<\/em><\/figcaption><\/figure>\n<\/div>\n\n<div class=\"wp-block-image\">\n<figure class=\"aligncenter size-full is-resized\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/hofelich38-example-26\/\"><img loading=\"lazy\" decoding=\"async\" width=\"2500\" height=\"1031\" src=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-26.jpg\" alt=\"Hofelich, Example 26\" class=\"wp-image-9876\" style=\"width:512px\" srcset=\"https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-26.jpg 2500w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-26-300x124.jpg 300w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-26-1024x422.jpg 1024w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-26-768x317.jpg 768w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-26-1536x633.jpg 1536w, https:\/\/theory.esm.rochester.edu\/integral\/wp-content\/uploads\/2025\/07\/hofelich38-example-26-2048x845.jpg 2048w\" sizes=\"auto, (max-width: 706px) 89vw, (max-width: 767px) 82vw, 740px\" \/><\/a><figcaption class=\"wp-element-caption\"><em><strong>Example 26. <\/strong>Middleground sketch of Shostakovich, Fugue in G minor, op. 87, no. 22. Static Urlinie (reproduced from Marlowe 2013, 171).<\/em><\/figcaption><\/figure>\n<\/div>\n\n\n<p>The structural immobilization of Prelude no. 22, as in Prelude no. 4, is the result of large-scale melodic inactivity. In each of the piece\u2019s two cycles, tonic expansion prevents structural arpeggiation or the appearance of a dominant harmony. It is significant that Fugue no. 22 in G minor, the fugue paired with this prelude, also generates a static <em>Urlinie<\/em> (see <strong>Example 26<\/strong>; Marlowe 2013, 171). Although the fugue\u2019s <em>Urlinie<\/em> retains $$\\hat{5}$$ instead of $$\\hat{3}$$, the highest levels of structure in both middleground interpretations render prolongational stasis through $$\\hat{5}$$\u2013$$\\hat{6}$$\u2013$$\\hat{5}$$ motions. Additionally, the fugue echoes the unresolved cadential six-four in the prelude, denying structural resolution in its harmonic dimensions and in the structural melody. In the prelude, recurring $$\\hat{5}$$\u2013$$\\hat{6}$$\u2013$$\\hat{5}$$ and $$\\hat{3}$$\u2013$$\\hat{4}$$\u2013$$\\hat{3}$$ neighboring motions and their chromatic counterparts, combined with the static middleground, establish a petrified musical exterior.<span id='easy-footnote-28-9747' class='easy-footnote-margin-adjust'><\/span><span class='easy-footnote'><a href='https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/#easy-footnote-bottom-28-9747' title='For another example of a static &lt;em&gt;Urlinie&lt;\/em&gt;, see Salzer\u2019s (1952, 248\u2013249) analysis of Hindemith\u2019s Piano Sonata no. 2 (1936).'><sup>28<\/sup><\/a><\/span>\n\n\n\n<h2 class=\"wp-block-heading\"><strong>Conclusion<\/strong><\/h2>\n\n\n\n<p>This analysis cultivates a space for exploring how Shostakovich\u2019s music expresses tonality. Harmonic surface tension is generated through modal lowering, chromaticism, and triadic post-tonal passages that intensify underlying tonal progressions and prolongations. Middleground examination of Prelude nos. 4, 13, and 22 from the Twenty-Four Preludes and Fugues illustrates how Shostakovich\u2019s synthesis of orthodox compositional practice and triadic post-tonality engages with structural directedness and expansion, rendering models for structural hearing comparable to those in the Bach-to-Brahms tradition. This study also promotes a methodological pluralism by constructing dialogue between varied approaches to Shostakovich\u2019s music, including prolongational methodologies, neo-Riemannian theory, and Russian modal-scalar perspectives. Shostakovich expands on contrapuntal voice-leading principles without dismantling the functional roles of impacted harmonies. This reconstructed vision of tonality resonates with Matthew Brown\u2019s impressions of the outer limits of Schenker\u2019s theory of harmonic relations. He writes, \u201cFor Schenker, the tonal universe encompasses an almost limitless range of harmonic possibilities, restricted only by the rules of voice leading\u201d (Brown 1986, 25). This investigation provides a foundation for linear approaches to Shostakovich\u2019s music, but there are many passages amenable to prolongational techniques that remain to be explored. Further examination of tonal activity in Shostakovich\u2019s works would reveal additional structural connections and shed light on significant aspects of his compositional process.<\/p>\n\n\n\n<hr class=\"wp-block-separator has-alpha-channel-opacity\"\/>\n\n\n\n<h2 class=\"wp-block-heading\"><strong>References<\/strong><\/h2>\n\n\n\n<p>Baker, James M. 1983. \u201cSchenkerian Analysis and Post-Tonal Music.\u201d In <em>Aspects of Schenkerian Theory<\/em>, edited by David Beach, 153\u2013186. New Haven: Yale University Press.<\/p>\n\n\n\n<p>\u2014\u2014\u2014. 1990. \u201cVoice Leading in Post-Tonal Music: Suggestions for Extending Schenker\u2019s Theory.\u201d <em>Music Analysis<\/em> 9 (2): 177\u2013200.<\/p>\n\n\n\n<p>Bass, Richard. 1988. \u201cProkofiev\u2019s Technique of Chromatic Displacement.\u201d <em>Music Analysis<\/em> 7 (2): 197\u2013214.<\/p>\n\n\n\n<p>Bakulina, Ellen. 2015. \u201cTonality and Mutability in Rachmaninoff\u2019s <em>All-Night Vigil<\/em>, Movement 12.\u201d <em>Journal of Music Theory<\/em> 59 (1): 63\u201397.<\/p>\n\n\n\n<p>\u2014\u2014\u2014. 2018. \u201cProto-Harmony and the Problem of Tonal Centricity in Rachmaninoff\u2019s <em>All-Night Vigil<\/em>.\u201d <em>Int\u00e9gral<\/em> 32: 15\u201336.<\/p>\n\n\n\n<p>Brown, Matthew. 1986. \u201cThe Diatonic and the Chromatic in Schenker\u2019s Theory of Harmonic Relations.\u201d <em>Journal of Music Theory <\/em>30 (1): 1\u201333.<\/p>\n\n\n\n<p>\u2014\u2014\u2014. 1993. \u201cTonality and Form in Debussy\u2019s <em>Pr\u00e9lude \u00e0 \u2018L\u2019Apr\u00e8s-midi d\u2019un faune.\u2019<\/em>\u201d <em>Music Theory Spectrum<\/em> 15 (2): 127\u2013143.<\/p>\n\n\n\n<p>\u2014\u2014\u2014. 2005. <em>Explaining Tonality: Schenkerian Theory and Beyond<\/em>. Rochester: University of Rochester Press.<\/p>\n\n\n\n<p>Carpenter, Ellon. 1995. \u201cRussian Theorists on Modality in Shostakovich\u2019s Music.\u201d In <em>Shostakovich Studies<\/em>, edited by David Fanning, 76\u2013112. New York: Cambridge University Press.<\/p>\n\n\n\n<p>Cohn, Richard. 1998. \u201cIntroduction to Neo-Riemannian Theory: A Survey and a Historical Perspective.\u201d <em>Journal of Music Theory<\/em> 42 (2): 167\u2013180.<\/p>\n\n\n\n<p>\u2014\u2014\u2014. 2004. \u201cUncanny Resemblances: Tonal Signification in the Freudian Age.\u201d <em>Journal of the American Musicological Society<\/em> 57 (2): 285\u2013324.<\/p>\n\n\n\n<p>Ewell, Philip. 2019. \u201cOn the Russian Concept of L\u0101d, 1830\u20131945.\u201d <em>Music Theory Online<\/em> 25 (4). https:\/\/www.mtosmt.org\/issues\/mto.19.25.4\/mto.19.25.4.ewell.html.<\/p>\n\n\n\n<p>\u2014\u2014\u2014. 2020. \u201cHarmonic Functionalism in Russian Music Theory: A Primer.\u201d <em>Theoria<\/em> 26: 31\u201384.<\/p>\n\n\n\n<p>Fanning, David. 1989. <em>The Breath of the Symphonist: Shostakovich\u2019s Tenth<\/em>. London: Routledge.<\/p>\n\n\n\n<p>\u2014\u2014\u2014. 1995. \u201cIntroduction. Talking about Eggs: Musicology and Shostakovich.\u201d In <em>Shostakovich Studies<\/em>, edited by David Fanning, 1\u201316. New York: Cambridge University Press.<\/p>\n\n\n\n<p>\u2014\u2014\u2014. 2010. \u201cShostakovich and Structural Hearing.\u201d In <em>Shostakovich Studies 2,<\/em> edited by Pauline Fairclough, 77\u201399. New York: Cambridge University Press.<\/p>\n\n\n\n<p>Fay, Laurel E. 2000. <em>Shostakovich: A Life<\/em>. New York: Oxford University Press.<\/p>\n\n\n\n<p>Forrest, David. 2010. \u201cProlongation in the Choral Music of Benjamin Britten.\u201d <em>Music Theory Spectrum<\/em> 32 (1): 1\u201325.<\/p>\n\n\n\n<p>Goldenberg, Yosef. 2007. \u201cSchenkerian Voice-Leading and Neo-Riemannian Operations: Analytical Integration without Theoretical Reconciliation.\u201d <em>Journal of Schenkerian Studies<\/em> 2: 65\u201386.<\/p>\n\n\n\n<p>Harrison, Daniel. 2016. <em>Pieces of Tradition: An Analysis of Contemporary Tonal Music<\/em>. New York: Oxford University Press.<\/p>\n\n\n\n<p>Heetderks, David. 2015. \u201cFrom Uncanny to Marvelous: Poulenc\u2019s Hexatonic Pole.\u201d <em>Theory and Practice<\/em> 40: 177\u2013204.<\/p>\n\n\n\n<p>Henderson, Lyn. 2000. \u201cShostakovich and the Passacaglia: Old Grounds or New?\u201d <em>The Musical Times <\/em>141 (1870): 53\u201360.<\/p>\n\n\n\n<p>Hussey, William. 2003. \u201cTriadic Post-Tonality and Linear Chromaticism in the Music of Dmitri Shostakovich.\u201d <em>Music Theory Online <\/em>9 (1). <a href=\"http:\/\/www.mtosmt.org\/issues\/mto.03.9.1\/mto.03.9.1.hussey.html\">http:\/\/www.mtosmt.org\/issues\/mto.03.9.1\/mto.03.9.1.hussey.html<\/a>.<\/p>\n\n\n\n<p>Jackson, Timothy. 2024. \u201c\u2018A True and Genuine Music\u2019: Berg\u2019s Linear Counterpoint.\u201d <em>Rivista di Analisi e Teoria Musicale<\/em> 30 (1): 7\u201391.<\/p>\n\n\n\n<p>Kuhn, Judith. 2010. <em>Shostakovich in Dialogue: Form, Imagery and Ideas in Quartets 1\u20137.<\/em> Burlington, VT: Ashgate.<\/p>\n\n\n\n<p>Lerdahl, Fred. 1989. \u201cAtonal Prolongational Structure.\u201d <em>Contemporary Music Review<\/em> 4 (1): 65\u201387.<\/p>\n\n\n\n<p>Lester, Joel. 1970. \u201cA Theory of Atonal Prolongations as Used in an Analysis of the Serenade Op. 24 by Arnold Schoenberg.\u201d PhD diss., Princeton University.<\/p>\n\n\n\n<p>\u2014\u2014\u2014. 1999. <em>Bach\u2019s Works for Solo Violin<\/em>. New York: Oxford University Press.<\/p>\n\n\n\n<p>Marlowe, Sarah Rose. 2013. \u201cFugue in Context: A Schenkerian Approach to Select Works by J.S. Bach and Dmitri Shostakovich.\u201d PhD diss., University of Rochester.<\/p>\n\n\n\n<p>McCreless, Patrick. 2009. \u201cDmitri Shostakovich: The String Quartets.\u201d In <em>Intimate Voices: The Twentieth-Century String Quartet<\/em>.Vol. 2, <em>Shostakovich to the Avant-Garde<\/em>, edited by Evan Jones, 3\u201340. Rochester: University of Rochester Press.<\/p>\n\n\n\n<p>\u2014\u2014\u2014. 2010. \u201cShostakovich\u2019s Politics of D Minor and Its Neighbours, 1931\u20131949.\u201d In <em>Shostakovich Studies 2,<\/em> edited by Pauline Fairclough, 121\u2013189. New York: Cambridge University Press.<\/p>\n\n\n\n<p>Ottaway, Hugh. 1975. \u201cLooking Again at Shostakovich 4.\u201d <em>Tempo<\/em>, no.115: 14\u201324.<\/p>\n\n\n\n<p>Renwick, William. 1995. <em>Analyzing Fugue: A Schenkerian Approach<\/em>. New York: Pendragon Press.<\/p>\n\n\n\n<p>Rusch, Ren\u00e9. 2012\u201313. \u201cSchenkerian Theory, Neo-Riemannian Theory and Late Schubert: A Lesson from Tovey.\u201d <em>Journal of the Society for Musicology in Ireland<\/em> 8: 3\u201320.<\/p>\n\n\n\n<p>Salzer, Felix. 1952. <em>Structural Hearing: Tonal Coherence in Music<\/em>. New York: Dover Publications.<\/p>\n\n\n\n<p>Schenker, Heinrich. 1977. <em>Free Composition<\/em>. Edited and translated by Ernst Oster. Hillsdale, NY: Pendragon Press.<\/p>\n\n\n\n<p>\u2014\u2014\u2014. 1987. <em>Counterpoint<\/em>. Vol. 1, translated by John Rothgeb and Jurgen Thym. New York: Schirmer.<\/p>\n\n\n\n<p>Segall, Christopher. 2019. \u201cProlongational Analysis Without Beams and Slurs: A View from Russian Music Theory.\u201d <em>Journal of Schenkerian Studies <\/em>12: 183\u2013188.<\/p>\n\n\n\n<p>Straus, Joseph. 1987. \u201cThe Problem of Prolongation in Post-Tonal Music.\u201d <em>Journal of Music Theory<\/em> 31 (1): 1\u201321.<\/p>\n\n\n\n<p>Taruskin, Richard. 2008. <em>On Russian Music<\/em>. Berkeley: University of California Press. Teo, Yvonne. 2018. \u201cHybridising the Schenkerian Method: A Selected Section of the First Movement of Paul Hindemith\u2019s Piano Sonata No. 1 as a Case Study.\u201d <em>Context<\/em> 43: 29\u201346.<\/p>\n","protected":false},"excerpt":{"rendered":"<p>Trevor C. Hofelich Abstract Schenkerian views of mixture and counterpoint address a wide range of chromatic activity in Dmitri Shostakovich\u2019s monotonal works. Emulating contrapuntal procedures in Johann Sebastian Bach\u2019s Well-Tempered Clavier, preludes in Shostakovich\u2019s Twenty-Four Preludes and Fugues, op. 87 (1950\u20131951) are especially amenable to linear analysis. Not only do the op. 87 preludes exhibit &hellip; <\/p>\n<p class=\"link-more\"><a href=\"https:\/\/theory.esm.rochester.edu\/integral\/38-2025\/hofelich\/\" class=\"more-link\">Continue reading<span class=\"screen-reader-text\"> &#8220;Vignettes for Structural Hearing in the Music of Dmitri Shostakovich: Prolongational Approaches to Three Preludes&#8221;<\/span><\/a><\/p>\n","protected":false},"author":19,"featured_media":0,"parent":9662,"menu_order":0,"comment_status":"closed","ping_status":"closed","template":"","meta":{"_oasis_is_in_workflow":0,"_oasis_original":0,"_exactmetrics_skip_tracking":false,"_exactmetrics_sitenote_active":false,"_exactmetrics_sitenote_note":"","_exactmetrics_sitenote_category":0,"footnotes":""},"class_list":["post-9747","page","type-page","status-publish","hentry"],"_links":{"self":[{"href":"https:\/\/theory.esm.rochester.edu\/integral\/wp-json\/wp\/v2\/pages\/9747","targetHints":{"allow":["GET"]}}],"collection":[{"href":"https:\/\/theory.esm.rochester.edu\/integral\/wp-json\/wp\/v2\/pages"}],"about":[{"href":"https:\/\/theory.esm.rochester.edu\/integral\/wp-json\/wp\/v2\/types\/page"}],"author":[{"embeddable":true,"href":"https:\/\/theory.esm.rochester.edu\/integral\/wp-json\/wp\/v2\/users\/19"}],"replies":[{"embeddable":true,"href":"https:\/\/theory.esm.rochester.edu\/integral\/wp-json\/wp\/v2\/comments?post=9747"}],"version-history":[{"count":20,"href":"https:\/\/theory.esm.rochester.edu\/integral\/wp-json\/wp\/v2\/pages\/9747\/revisions"}],"predecessor-version":[{"id":13592,"href":"https:\/\/theory.esm.rochester.edu\/integral\/wp-json\/wp\/v2\/pages\/9747\/revisions\/13592"}],"up":[{"embeddable":true,"href":"https:\/\/theory.esm.rochester.edu\/integral\/wp-json\/wp\/v2\/pages\/9662"}],"wp:attachment":[{"href":"https:\/\/theory.esm.rochester.edu\/integral\/wp-json\/wp\/v2\/media?parent=9747"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}