Get 20M+ Full-Text Papers For Less Than $1.50/day. Start a 14-Day Trial for You or Your Team.

Learn More →

Klumpenhouwer Networks and Some Isographies that Involve Them

Klumpenhouwer Networks and Some Isographies that Involve Them Abstract Networks involving T and I operations are useful for interpreting pc-sets, and for other purposes. Certain groups of isographies among such networks, being isomorphic to the T/I group itself, are particularly interesting. A T/I network can interpret one chord within a progression, while an isographic network can interpret an interrelation among the several (interpreted) chords of that progression as a whole. A variety of interpretations is possible at each level, posing challenges for analysis. This content is only available as a PDF. Author notes David Lewin is Professor of Music at Harvard University. © 1990 by the Society for Music Theory, Inc. http://www.deepdyve.com/assets/images/DeepDyve-Logo-lg.png Music Theory Spectrum Oxford University Press

Klumpenhouwer Networks and Some Isographies that Involve Them

Music Theory Spectrum , Volume 12 (1) – Mar 1, 1990

Loading next page...
 
/lp/oxford-university-press/klumpenhouwer-networks-and-some-isographies-that-involve-them-v2Vw9JHNOg

References (0)

References for this paper are not available at this time. We will be adding them shortly, thank you for your patience.

Publisher
Oxford University Press
Copyright
© 1990 by the Society for Music Theory, Inc.
ISSN
0195-6167
eISSN
1533-8339
DOI
10.2307/746147
Publisher site
See Article on Publisher Site

Abstract

Abstract Networks involving T and I operations are useful for interpreting pc-sets, and for other purposes. Certain groups of isographies among such networks, being isomorphic to the T/I group itself, are particularly interesting. A T/I network can interpret one chord within a progression, while an isographic network can interpret an interrelation among the several (interpreted) chords of that progression as a whole. A variety of interpretations is possible at each level, posing challenges for analysis. This content is only available as a PDF. Author notes David Lewin is Professor of Music at Harvard University. © 1990 by the Society for Music Theory, Inc.

Journal

Music Theory SpectrumOxford University Press

Published: Mar 1, 1990

There are no references for this article.