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       M U S I C          T H E O R Y         O N L I N E

                     A Publication of the
                   Society for Music Theory
          Copyright (c) 1996 Society for Music Theory
+-------------------------------------------------------------+
| Volume 2, Number 3      March, 1996      ISSN:  1067-3040   |
+-------------------------------------------------------------+

  All queries to: mto-editor@boethius.music.ucsb.edu or to
                  mto-manager@boethius.music.ucsb.edu
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AUTHOR: Agmon, Eytan
TITLE: Conventional Harmonic Wisdom and the Scope of Schenkerian Theory: 
  A Reply to John Rothgeb
KEYWORDS: functional harmony, Riemann, Schenker, context, *Stufe*, 
  *Auskomponierung*, *Ursatz*
REFERENCE: mto.96.2.1.rothgeb.tlk

Eytan Agmon
Bar-Ilan University
Department of Musicology
52900 Ramat-Gan
Israel
agmone@ashur.cc.biu.ac.il

ABSTRACT: The essay consists of three parts. (1) A 
response to John Rothgeb's objections to the modified 
version of Riemann's functional harmonic theory proposed
in Eytan Agmon's *Spectrum* article, "Functional Harmony 
Revisited." (2) A discussion of the conflict between the 
type of "conventional harmonic wisdom" that (modified)
functionalism represents and Schenker's view of tonality.
(3) A discussion of what this conflict implies as far as
the scope of Schenkerian theory is concerned.

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[1] In "Functional Harmony Revisited: A Prototype-
Theoretic Approach" (henceforth, FHR), I have proposed a 
modified version of Hugo Riemann's functional harmonic 
theory.(1) John Rothgeb, in a recent MTO contribution, 
objects to the (modified) theory on two main counts. 
First, given an approach to tonal pitch-structure (such as 
Heinrich Schenker's) that emphasizes context in general 
and voice leading in particular, (modified) functionalism 
is superfluous or trivial at best, if not downright 
pernicious; second, the theory leads to a deplorable 
intellectual regression, since it negates such remarkable 
theoretical achievements as Schenker's notions of "scale-
step" (*Stufe*) and "composing-out" (*Auskomponierung*).(2)

==========================================================
1. *Music Theory Spectrum* 17:2 (1995), 196-214.

2. John Rothgeb, "Re: Eytan Agmon on Functional Theory," 
*Music Theory Online* 2.1 (1996). 
==========================================================

[2] I shall begin the present essay by responding to 
Rothgeb's objections; neither, I hope to demonstrate, 
stands up under scrutiny. However, I believe that Rothgeb 
is nonetheless correct in sensing that a serious conflict 
indeed exists between "conventional [harmonic] wisdom," of 
which functionalism is apparently an important ingredient, 
and certain tenets of Schenker's theory.(3) In the second 
part of this essay, therefore, I shall attempt to isolate 
the source of this conflict; I shall conclude the essay by 
considering the conflict's implications as far as the 
scope of Schenkerian theory is concerned.(4)

==========================================================
3. The expression "conventional [harmonic] wisdom" 
appears in n. 12 of Rothgeb's commentary. The 
condescending tone in which this expression is used recurs 
in Rothgeb's reference to "the language of the completely 
conventional harmony textbook" in par. 11, and his 
reference to "most undergraduate students" in par. 14.

4. At least two of Rothgeb's grievances seem to reflect 
plain miscomprehension of my text. His discussion in 
paragraphs 14-15 of "II as IV" is totally beside the point 
in view of the category/chord distinction on which 
modified functionalism so crucially depends (see 
especially FHR, p. 204). Similarly, one of Rothgeb's 
central lines of attack on FHR, concerning the role of 
context in harmonic theory (of which more shall be said 
subsequently), seems oblivious of the important 
distinction on p. 206 between the functional *potential* 
of a given chord, which the theory proposed in FHR sets 
out to describe, and the realization of that potential in 
context (which, strictly speaking, lies outside the scope 
of the proposed theory). To be sure, for someone who does 
not believe in harmonic functions in the first place, my 
claim that a certain functional potential (specifically, 
the subdominant function of VII) can hardly ever be 
realized, is an easy target for critique, especially since 
that claim is supported in part by an appeal to a 
hypothetical theory of chord progression. However, in 
terms of discrediting the theory as a whole the effect of 
such critique is negligible. 
==========================================================

[3] Rothgeb purports to establish the superfluousness of 
functional theory, vis a vis an approach that emphasizes 
context and voice leading, by analyzing the concluding 
bars of Schumann's "Am Kamin" from *Kinderszenen* (see 
Example 1); he concentrates in particular on the "vertical 
event" marked "X." For present purposes, Rothgeb's 
argument may be reduced to three essential claims: "strong 
horizontalism," "weak horizontalism," and "contextualism."

Example 1. Schumann, "Am Kamin," mm. 29-32

[4] *Strong horizontalism*. According to strong 
horizontalism, X is a more-or-less accidental result of 
linear motion; in particular, the note a ". . . serves as. 
. . an escape tone or an incomplete upper neighbor, . . . 
[or better yet] an anticipation of the third of the coming 
tonic harmony" (par. 6). It follows that "the note a *in 
no sense functions as a harmonic root* here. The chord 
under discussion is *not* an inversion of an a-minor 
triad" (par. 8).

[5] For all that Schenker would have us believe that 
linear motion in tonal music--apparently by some divine 
miracle--tends to yield precisely triads and seventh 
chords as vertical sonorities, strong horizontalism is a 
patently absurd position. In Example 2 Schumann's X is 
replaced by an impostor vertical event *X (Schumann's 
concluding tonic is also slightly altered in the example: 
it now features ^3^ in the soprano rather than ^1^). In 
voice-leading terms, X and *X are exactly analogous (the f 
in *X is also an escape tone or anticipation of the coming 
tonic harmony); yet *X is plainly unacceptable.

Example 2. "Am Kamin," recomposed

[6] In view of Ex. 2 one might concede that X is not 
totally unconstrained as a vertical event (although it 
nonetheless falls short of being a triad); X, one might 
propose, is consonant. However, Example 3a, where 
Schumann's cadence is transposed to minor, exposes the 
uselessness of such a move. The relationship between X' 
and *X' in Exx. 3a and 3b is exactly analogous to the 
relationship between X and *X in Exx. 1 and 2, even though 
X' is dissonant. Moreover, when it comes to seventh 
chords, the consonance criterion must in any event be 
abandoned. In paragraph 8 Rothgeb explains "the origin of 
Schumann's II[6/5] as a result of extending the bass of IV 
and letting the treble anticipate the fifth of the coming 
V." Would Rothgeb be willing to accept on equal terms a IV 
chord that similarly anticipates the *third* of the coming 
V?

Example 3. a) The "Am Kamin" cadence, transposed to minor;
b) recomposition of a.

[7] Once one concedes that X is a triad (rather than some 
accidental collection of pitches), one must also concede 
that X is an a-minor triad in first inversion, that is, a 
III6 chord. To be sure, the *function* of X is not 
specified by the III6 label; the purpose of (modified) 
functionalism is precisely to fill-in this theoretical 
void. According to (modified) functionalism, X "has 
dominant function"; X, in other words, is a member of a 
set of triads--a category--whose *prototype* is V. The 
relationship between X and V, moreover, is one of *maximal 
similarity*, that is, the two triads have two tones in 
common.

[8] As it happens, Rothgeb also sees a relationship 
between X and a hypothetical V: "people who hear musically 
will have a strong predilection to hear this final 
[falling] fifth [in the bass] as representing V-I even 
though its penultimate member does not bear the 5/3 
sonority which alone would provide full congruence between 
scale-degree meaning and vertical chord" (par. 8). Indeed, 
given this statement (together with Rothgeb's earlier 
concession that I, IV, and V "are indeed primary in some 
meaningful sense"), one begins to wonder what the dispute 
is all about. Nonetheless, from his discussion of the 
IV/II relationship (see especially par. 8, as well as par. 
16 and n. 14), one suspects that Rothgeb would object to 
seeing the V/III relationship in terms of common tones; 
rather, for Rothgeb the V/III relationship is once again a 
matter of voice leading.

[9] *Weak horizontalism*. Weak horizontalism concedes that 
X is a triad (thus X is a III6 chord--no "shudder-quotes" 
required); moreover, weak horizontalism sees an essential 
relationship between X and a hypothetical V chord. 
However, unlike functionalism, that sees the V/III 
relationship in terms of common tones, weak horizontalism 
prefers to see a 5-6 linear exchange (Example 4).

Example 4. The V/III relationship: a) according to 
functionalism; b) according to weak horizontalism

[10] Unlike strong horizontalism, weak horizontalism is by 
no means an absurd position. Indeed, it appears that no 
convincing counter-argument to weak horizontalism existed 
prior to my 1991 paper entitled "Linear Transformations 
Between Cyclically Generated Chords," where it was pointed 
out that our ability to describe chordal relationships in 
tonal music both "harmonically" and "linearly"--as in Ex. 
4--cannot be taken for granted.(5) For example, within a 
7-note cyclic set the triad and seventh chord are the 
*only* generated chords that form linear connections in 
any pairwise combination (that is, any triad or seventh 
chord can connect linearly to any other triad or seventh 
chord), assuming that the linear connections satisfy a 
certain "efficiency" constraint. The essential idea 
involved is illustrated (for triads only) in Example 5. 
The article mentioned proceeds to propose *definitions* 
for "triad" and "seventh chord" based on this linear 
criterion.

==========================================================
5. Eytan Agmon, "Linear Transformations Between 
Cyclically Generated Chords," *Musikometrika* 3 (1991), 
15-40. 
==========================================================

Example 5. Fig. 2 from Eytan Agmon, "Linear 
Transformations Between Cyclically Generated Chords" 
(*Musikometrika* 3, 1991) 

[11] Once "triad" and "seventh chord" are defined on the 
basis of voice-leading considerations, the pernicious 
harmony/voice-leading dichotomy loses much of its force. 
In particular, *to say that III is related to V by virtue 
of two common tones, and to say that III(6) is related to 
V by virtue of a 5-6 linear exchange, is to make two 
logically equivalent statements*.(6) All the same, to base 
a functional harmonic theory on voice leading would be a 
poor choice indeed. In a "deceptive cadence" V-VI, for 
example, it makes little sense to say that the VI is 
related to a hypothetical I by virtue of a 5-6 linear 
exchange; yet in terms of common tones, the case is 
exactly analogous to the V/III relationship initially 
discussed. In other words, the common-tone relationship 
between a "secondary" triad and a "primary" one is 
theoretically more general than the (logically equivalent) 
voice-leading relationship, which seems to play a more 
restricted, context-related role. 

==========================================================
6. See "Linear Transformations," pp. 22-3. In n. 14 
Rothgeb refers to the "equivocality of the 6/3 chord, in 
which the 6 may in principle represent either a linear 
element or the root of an inverted chord." 
==========================================================

[12] *Contextualism*. One may agree that X is a III6 chord 
with a strong "aura" of V, yet nonetheless disagree with 
functionalism concerning a necessary, a priori 
relationship between the two chords. The V/III 
relationship, one may argue, is purely contextual, and can 
be replaced by any "X/Y" relationship whatsoever.

[13] The doctrine of contextualism is with us at least 
since 1934, when Oswald Jonas stated that 
functionalism "had to fail, because it neglected the fact 
that two occurrences of the same chord could be worlds 
apart in meaning, and that *everything* depended on 
context."(7) Rothgeb echoes the idea in paragraph 9 of his 
commentary:

"When I say that in this case [i.e., Schumann's "Am 
Kamin"] "III" *means* V, the word *means* may be 
explicated as "constitutes, or is included within, a 
harmonic expression of." "III" may equally *mean* I; "II" 
may *mean* IV; indeed, instances of "X" *meaning* Y are 
legion in the repertoire of tonal music, and *virtually no 
a priori limits* can be set on the ranges of "X" and 
"Y"."(8)

==========================================================
7. Oswald Jonas, *Introduction to the Theory of Heinrich 
Schenker*, trans. and ed. John Rothgeb (New York: Longman, 
1982), 127 (emphasis added).

8. I have added emphasis to Rothgeb's "virtually no a-
priori limits." 
==========================================================

[14] Although Rothgeb concedes in a footnote that "certain 
limits would probably stand up under scrutiny," his 
statement is surely a gross misrepresentation of musical 
reality. Can "III" mean IV? Can "II" mean I? Can "IV" mean 
V? In fact, the examples of "X meaning Y" that Rothgeb 
cites are exactly those which functional theory allows.

[15] Since Rothgeb proceeds in the next paragraph to 
consider Schenker's notion of "scale-step," I suspect that 
when he speaks of no a priori constraints on "X meaning Y" 
he has in mind *hierarchical subordination* rather than 
functional significance. In Schenker's theory, III (for 
example) may participate in *prolonging* IV, as IV may 
participate in prolonging V. And indeed, when it comes to 
hierarchy, functionalism seems to suffer badly in 
comparison to Schenker's theory, which introduced the 
profound idea of structural levels (recursive embedding) 
to tonal theory. However, in FHR I have claimed that 
(modified) functionalism "is compatible with a 
hierarchical approach" (p. 203); I should now like to make 
good this claim.

[16] *Functional Auskomponierung*.(9) Fig. 1a reproduces 
Figure 2c from FHR. Note that the figure is drawn from the 
vantage point of the tonic triad, whose referential status 
is assumed a priori. This means that Fig. 1a would 
generate--in conjunction with a theory of chord 
progression--functionally interpreted progressions that 
*prolong I* (e.g., I-IV-V-I), and only I; thus Fig. 1a may 
be termed a *I-Stufe functional diagram*.

==========================================================
9. Only the bare outlines of the theory are sketched 
here; I hope to flesh-out the details in a separate study. 
==========================================================

Figure 1. a) The I-*Stufe* functional diagram (FHR, Fig. 
2c); b) The V-*Stufe* functional diagram

[17] Figure 1a may be analyzed in terms of two independent 
components: a circle of third-related triads, and a 
"functional grid" by which the seven triads are divided 
into three categories, and where, for each category, a 
specific triad is selected as prototype. Suppose now that 
one rotates the circle of triads in Fig. 1a--but not the 
underlying functional grid!--in such a way that V occupies 
the former position of I (Figure 1b); we now have a V-
*Stufe* functional diagram. In conjunction with the same 
theory of chord progression, Fig. 1b generates 
functionally interpreted progressions that *prolong V*, 
e.g. V-I-V (T-S-T), V-IV-V (T-D-T), V-II-V (T-D-T), etc. 
In a similar fashion, any of the seven harmonic degrees 
may assume a *Stufe* role. To create a functional 
hierarchy one begins by generating a I-*Stufe* progression 
(say, I-II-V-I) at the highest level. One then selects any 
harmonic degree from this progression--say, II--as a 
lower-level *Stufe*, and (using the appropriate functional 
diagram) generates a hierarchically subordinate, 
functionally interpreted progression (say, II-I-II); in a 
recursive fashion, one may create functionally interpreted 
progressions embedded to any arbitrary hierarchical depth.

[18] Example 6 illustrates a typical progression generated 
by the theory of functional *Auskomponierung*. Carl 
Schachter, who invented the progression, views the II and 
V chords in mm. 2-3 as prolonged or composed-out 
(*Auskomponiert*) entities.(10) It is important to realize 
that even though voice leading plays a crucial role in the 
*Auskomponierung* process (note the voice exchanges), 
other factors (such as rhythm and meter) are equally 
involved. In FHR I have drawn a clear distinction between 
the functional *potential* of a given triad, which is 
given a priori, and the *realization* of that potential, 
which is context-dependent (p. 206). For example, the potential 
of I to assume dominant function in a II-*Stufe* 
progression (such as II-I-II) is given a priori in 
(modified) functional theory; to bring this potential into 
musical fruition, however, may require a coordination 
among several compositional variables, as Ex. 6 
illustrates. Schenker has made a lasting contribution to 
tonal theory in emphasizing the crucial contextual role of 
voice leading. However, Schenker also believed that voice 
leading can be promoted above and beyond any other 
principle as the basis for a theory of tonal structure; 
this latter belief is the source of some serious conflicts 
with the type of "conventional harmonic wisdom" that 
(modified) functionalism represents.

==========================================================
10. Carl Schachter, "Analysis by Key: Another Look at 
Modulation," *Music Analysis* 6:3 (1987), 292. In light of 
the present discussion, *Auskomponierung* may seem to 
apply only to functionally interpreted progressions that 
begin and end on the same chord (e.g., II-I-II). However, 
any functionally interpreted progression referable to a 
given scale degree may be said to *prolong* or *compose-
out* that degree. For example, I-V-VI, as a I-*Stufe* 
progression, may be said to prolong I.

==========================================================

Example 6. After Carl Schachter, "Analysis by Key: Another 
Look at Modulation" (*Music Analysis* 6:3, 1987), Example 
3

II

[19] In the preceding section I have presented arguments 
which I believe set to rest Rothgeb's objections to 
(modified) functionalism. In particular, strong 
horizontalism, weak horizontalism, and contextualism have 
been shown to be either plainly unacceptable or irrelevant 
doctrines, which leaves Rothgeb's claims concerning the 
superfluousness of (modified) functionalism without 
support. Moreover, the idea of functional 
*Auskomponierung* renders Rothgeb's complaint concerning 
the intellectual poverty of functionalism (relative to 
Schenker's theory) no longer valid. Indeed, (modified) 
functionalism agrees with the Schenkerian approach on two 
important points: (1) tonal pitch structure is 
hierarchical in nature; (2) voice leading plays a crucial 
role in rendering the assumed hierarchy cognitively 
accessible. Nonetheless, it would be wrong to pretend that 
a serious conflict between the two theories does not 
exist. In the present section I should like to isolate the 
source of this conflict.

[20] For Schenker, all tonal structure is ultimately 
referable to the *Ursatz*, a theoretic construct whose 
rationale is essentially linear-contrapuntal: a dissonant 
passing-tone in the top voice is rendered consonant by 
means of a bass-arpeggiation. How does the *Ursatz* 
conflict with conventional harmonic wisdom? One conflict 
is immediately apparent. As far as the *Ursatz* is 
concerned, there are only two basic harmonic states, 
"tonic" and "dominant"; a third harmonic state (say, 
"subdominant") does not exist, or if it does, its status 
within the tonal hierarchy is, by definition, inferior.

[21] Even in terms of Schenker's own theory, the idea that 
IV or II6 represent some sort of "leaping passing-tone" 
configuration in the bass surely leaves much to be 
desired. Moreover, Schenker's account forces an 
uncomfortable analogy between the functions of IV and II6, 
on the one hand, and III (and even I6), on the other. 
However, I believe that Schenker's cavalier attitude 
towards the subdominant is problematic at a more basic, 
intuitive level. For while the subdominant may be the only 
component of a T-S-D-T progression whose removal does not 
violate a certain sense of progressional syntax, by 
conventional harmonic wisdom the difference between T-D-T 
and T-S-D-T is nonetheless crucial. Perhaps a linguistic 
analogy could help clarify this point. Consider the phrase 
"He ate his heart out." Although the deletion of "his 
heart out" yields a syntactically acceptable expression, 
something essential is surely lost in "reducing" "He ate 
his heart out" to "He ate." I have often heard the 
complaint that a musical phrase is robbed of its essence 
once the "structural subdominant" is removed; I believe such 
a complaint--even when it comes from an undergraduate 
student--deserves to be treated with respect.

[22] Schenker's *Ursatz* is at odds with conventional 
harmonic wisdom not only concerning the status of the 
subdominant; an even more severe conflict, I believe, 
concerns the dominant. By conventional harmonic wisdom, I-
V(7)-I is one of the least contextually constrained 
progressions; the progression retains its functional sense 
as T-D-T in countless possible realizations, which may 
vary considerably in terms of voice leading, bass 
progression, or registration. In Schenker's *Ursatz*, on 
the other hand, I-V-I is conceived in terms of severe a-
priori contextual constraints. Note, for example, that 
even such a simple deviation from the *Ursatz*-model where 
the bass, rather than leaping up a fifth from I to V, 
leaps down a fourth, is something to be accounted for. 
This hopeless "contextualization of the dominant" 
(together with the "a priorization of voice leading") 
ultimately leads to the utterly absurd position where I-
V6-I (say) is seen as more closely related to (say) I-
IV6/4-I than to I-V-I.

III

[23] Lest I should be once again accused of inciting 
intellectual regress, let me hasten to point out that my 
critique of Schenker's *Ursatz* applies only in so far as 
the construct is claimed to constitute a theory of 
tonality, a theory by which conventional harmonic wisdom 
is condescendingly dismissed. I have no objection 
whatsoever to a more limited interpretation of what the 
*Ursatz* stands for, for example, that the *Ursatz* (or 
some *Ursatz*-like configuration) is an *analytic 
construct*, hypothesized to describe the structure of some 
*specific piece of music* (or possibly a group of pieces); 
as such, the *Ursatz* may be seen as *a contextualized 
harmonic progression*, situated at some (possibly deep) 
level of compositional structure. Indeed, as a 
contextualized I-V-I progression Schenker's *Ursatz* makes 
much compositional sense, for it lends the progression, 
from the linear point of view, a clear sense of purpose 
and direction.

[24] I am well aware that for some readers, giving up 
Schenker's grand vision of tonality as an unfolding in 
time of the Chord of Nature may seem an exceedingly dear 
price to pay. But I also believe that for many others, 
who--like myself--deeply cherish the *analytic* insights 
that Schenker's approach has to offer, and yet are unable 
to turn their backs on conventional harmonic wisdom, there 
is simply no other choice. As someone whose involvement 
with the Schenkerian approach over the years has been more 
than casual, I know how difficult it can be to admit that 
Schenker delivers less than he promises. Nonetheless, I 
believe it is essential that the scope of Schenkerian 
theory be seriously reassessed. For if, as Rothgeb would 
have us believe, there is simply no way in which the ideas 
of Heinrich Schenker and Hugo Riemann may be reconciled, 
tonal theory is a very small town indeed. 



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