Yust, Jason2020-01-222020-01-222013-11-01Jason Yust. 2013. "A space for inflections: following up on JMM's special issue on mathematical theories of voice leading." Journal Of Mathematics And Music, Volume 7, Issue 3, pp. 175-193. https://doi.org/10.1080/17459737.2013.8538451745-97371745-9745https://hdl.handle.net/2144/39143Journal of Mathematics and Music's recent special issue 7(2) reveals substantial common ground between mathematical theories of harmony advanced by Tymoczko, Hook, Plotkin, and Douthett. This paper develops a theory of scalar inflection as a kind of voice-leading distance using quantization in voice-leading geometries, which combines the best features of different approaches represented in the special issue: it is grounded in the concrete sense of voice-leading distance promoted by Tymoczko, invokes scalar contexts in a similar way as filtered point-symmetry, and abstracts the circle of fifths like Hook's signature transformations. The paper expands upon Tymoczko's ‘generalized signature transform’ showing the deep significance of generalized circles of fifths to voice-leading properties of all collections. Analysis of Schubert's Notturno for Piano Trio and ‘Nacht und Träume’ demonstrate the musical significance of inflection as a kind of voice leading, and the value of a robust geometrical understanding of it.pp. 175-193Mathematics, interdisciplinary applicationsMusicMathematicsVoice leadingQuantizationGeometryScale theoryFiltered point-symmetryNeo-Riemannian theorySignature transformationsSchubert, FranzEnharmonicismChromatic harmonyApplied mathematicsPerforming arts and creative writingArticle10.1080/17459737.2013.85384536422