Mathematical models of flageolet harmonics on stringed instruments

Autores: Bernold Fiedler
Localización: Journal of computational and applied mathematics, ISSN 0377-0427, Vol. 254, Nº 1, 2013 (Ejemplar dedicado a: Nonlinear Elliptic Differential Equations, Bifurcation, Local Dynamics of Parabolic Systems and Numerical Methods), págs. 144-153
Idioma: inglés
DOI: 10.1016/j.cam.2012.12.009
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Resumen
- Flageolet is a common technique to elicit harmonics on stringed instruments like guitars, pianos, and the violin family: the bowed or plucked string is subdivided by a slight touch of the finger. The paper discusses appropriate linear wave equations which model the flageolet phenomenon. The standard second order wave equation fails, because the resulting Dirichlet boundary condition at the finger uncouples the two parts of the string and produces tones different from the flageolet. We include and discuss fourth order corrections, due to string stiffness, as a possible source for the flageolet phenomenon.