Real-time synthesis of clarinet-like instruments using digital impedance models.

A real-time synthesis model of wind instruments sounds, based upon a classical physical model, is presented. The physical model describes the nonlinear coupling between the resonator and the excitor through the Bernoulli equation. While most synthesis methods use wave variables and their sampled equivalent in order to describe the resonator of the instrument, the synthesis model presented here uses sampled versions of the physical variables all along the synthesis process, and hence constitutes a straightforward digital transposition of each part of the physical model. Moreover, the resolution scheme of the problem (i.e., the synthesis algorithm) is explicit and all the parameters of the algorithm are expressed analytically as functions of the physical and the control parameters.

[1]  Manfred R. Schroeder,et al.  Natural Sounding Artificial Reverberation , 1962 .

[2]  J. Schwinger,et al.  On the Radiation of Sound from an Unflanged Circular Pipe , 1948 .

[3]  Dottorato Di Ricerca,et al.  COMPUTATIONAL ISSUES IN PHYSICALLY-BASED SOUND MODELS , 2001 .

[4]  K. H. Hunt,et al.  Coefficient of Restitution Interpreted as Damping in Vibroimpact , 1975 .

[5]  Vesa Vlimki,et al.  Discrete-Time Modeling of Acoustic Tubes Using Fractional Delay Filters , 1998 .

[6]  Perry R. Cook,et al.  Identification Of Control Parameters In An Articulatory Vocal Tract Model, With Applications To The Synthesis Of Singing , 1990 .

[7]  Theodore A. Wilson,et al.  Operating modes of the clarinet , 1974 .

[8]  H. Levin On the radiation of sound from an unflanged circular pipe , 1948 .

[9]  Gary P. Scavone,et al.  An Acoustic Analysis Of Single-Reed Woodwind Instruments With An Emphasis On Design And Performance Issues And Digital Waveguide Modeling Techniques , 1997 .

[10]  E. Ngoya,et al.  Calculation of the steady‐state oscillations of a clarinet using the harmonic balance technique , 1989 .

[11]  Davide Rocchesso,et al.  Elimination of delay-free loops in discrete-time models of nonlinear acoustic systems , 2000, IEEE Trans. Speech Audio Process..

[12]  Murray Campbell,et al.  Discrete-time modeling of woodwind instrument bores using wave variables. , 2003, The Journal of the Acoustical Society of America.

[13]  B Gazengel,et al.  単リード吹奏楽器の時間領域シミュレーション 入力インピーダンス測定値からの信号合成 わなはどこにあるか , 1995 .