A graphical model for chord progressions embedded in a psychoacoustic space

Chord progressions are the building blocks from which tonal music is constructed. Inferring chord progressions is thus an essential step towards modeling long term dependencies in music. In this paper, a distributed representation for chords is designed such that Euclidean distances roughly correspond to psychoacoustic dissimilarities. Parameters in the graphical models are learnt with the EM algorithm and the classical Junction Tree algorithm. Various model architectures are compared in terms of conditional out-of-sample likelihood. Both perceptual and statistical evidence show that binary trees related to meter are well suited to capture chord dependencies.

[1]  Vesa Välimäki,et al.  Physical Modeling of Plucked String Instruments with Application to Real-Time Sound Synthesis , 1996 .

[2]  Michael I. Jordan Graphical Models , 1998 .

[3]  Grosvenor W. Cooper,et al.  The Rhythmic Structure of Music , 1971 .

[4]  S. Handel Listening As Introduction to the Perception of Auditory Events , 1989 .

[5]  Mark Levine,et al.  The Jazz Piano Book , 1989 .

[6]  Christopher K. I. Williams,et al.  Harmonising Chorales by Probabilistic Inference , 2004, NIPS.

[7]  Pantelis N. Vassilakis Chords as spectra; harmony as timbre , 1999 .

[8]  Tuire Kuusi,et al.  Set-class and chord : examining connection between theoretical resemblance and perceived closeness , 2003 .

[9]  E. Owens Introduction to the Psychology of Hearing , 1977 .

[10]  Jürgen Schmidhuber,et al.  Finding temporal structure in music: blues improvisation with LSTM recurrent networks , 2002, Proceedings of the 12th IEEE Workshop on Neural Networks for Signal Processing.

[11]  Yoshua Bengio,et al.  Learning long-term dependencies with gradient descent is difficult , 1994, IEEE Trans. Neural Networks.

[12]  Christopher Raphael,et al.  Harmonic analysis with probabilistic graphical models , 2003, ISMIR.

[13]  S. Handel,et al.  Listening: An Introduction to the Perception of Auditory Events , 1993 .

[14]  R. Jackendoff,et al.  A Generative Theory of Tonal Music , 1985 .

[15]  Jeremy Pickens,et al.  Polyphonic music modeling with random fields , 2003, MULTIMEDIA '03.

[16]  Ali Taylan Cemgil,et al.  Bayesian Music Transcription , 1997 .

[17]  D. Rubin,et al.  Maximum likelihood from incomplete data via the EM - algorithm plus discussions on the paper , 1977 .