WebJul 30, 1992 · Fortunately, despite theoretical results suggesting such recovery is not always possible, due to the existence of non-isometric isospectral shapes (i.e., "one cannot … WebDec 30, 2015 · The mathematics used to prove that “one can hear the corners of a drum” are founded on the study of two everyday phenomena: vibrations and heat conduction. These phenomena can be described by two mathematical equations, in the sense that if one can solve these equations, then one can predict the behavior of vibrations and heat …
[math/9207215] One cannot hear the shape of a drum
WebGordon, Carolyn; Webb, David, You can't hear the shape of a drum, American Scientist: ... Can one hear the shape of a fractal drum? Partial resolution of the Weyl–Berry conjecture, Geometric Analysis and Computer Graphics (Berkeley, … WebSimulations and illustrations related to Mark Kac's famous mathematical article about the inverse problem related to drum sounds. Namely, in addition to the ... cure for heart failure
[2304.04659] Can you hear your location on a manifold?
WebFeb 16, 2005 · Abstract A famous inverse problem posed by M Kac 'Can one hear the shape of a drum?' is concerned with isospectrality of drums or planer billiards, and the first counter example was constructed by Gordon, Webb and Wolpert (1992 Invent. Math. 110 1). To hear the shape of a drum is to infer information about the shape of the drumhead from the sound it makes, i.e., from the list of overtones, via the use of mathematical theory. "Can One Hear the Shape of a Drum?" is the title of a 1966 article by Mark Kac in the American Mathematical Monthly which … See more More formally, the drum is conceived as an elastic membrane whose boundary is clamped. It is represented as a domain D in the plane. Denote by λn the Dirichlet eigenvalues for D: that is, the eigenvalues of the See more Weyl's formula states that one can infer the area A of the drum by counting how rapidly the λn grow. We define N(R) to be the number of eigenvalues smaller than R and we get See more • Gassmann triple • Isospectral • Spectral geometry • Vibrations of a circular membrane See more In 1964, John Milnor observed that a theorem on lattices due to Ernst Witt implied the existence of a pair of 16-dimensional flat tori … See more For non-smooth boundaries, Michael Berry conjectured in 1979 that the correction should be of the order of $${\displaystyle R^{D/2},}$$ where D is the See more • Simulation showing solutions of the wave equation in two isospectral drums • Isospectral Drums by Toby Driscoll at the University of Delaware See more WebApr 10, 2024 · Can you hear your location on a manifold? Emmett L. Wyman, Yakun Xi. We introduce a variation on Kac's question, "Can one hear the shape of a drum?" Instead of … cure for heat rash