论文信息 - Spectral properties of distance matrices

Spectral properties of distance matrices

Distance matrices are matrices whose elements are the relative distances between points located on a certain manifold. In all cases considered here all their eigenvalues except one are non-positive. When the points are uncorrelated and randomly distributed we investigate the average density of their eigenvalues and the structure of their eigenfunctions. The spectrum exhibits delocalized and strongly localized states that possess different power-law average behaviour. The exponents depend only on the dimensionality of the manifold.

[1] Madan Lal Mehta,et al. Matrix theory : selected topics and useful results , 1989 .

[2] A. Erdélyi,et al. Higher Transcendental Functions , 1954 .

[3] A. Zee,et al. Spectra of euclidean random matrices , 1999 .

[4] A. Vershik. Distance matrices, random metrics and Urysohn space , 2002 .

[5] F. Gantmakher,et al. Théorie des matrices , 1990 .

[6] L. Pastur,et al. Introduction to the Theory of Disordered Systems , 1988 .

[7] I. J. Schoenberg. On Certain Metric Spaces Arising From Euclidean Spaces by a Change of Metric and Their Imbedding in Hilbert Space , 1937 .

[8] M. Kac. Can One Hear the Shape of a Drum , 1966 .

[9] E. Gardner,et al. Lyapounov exponent of the one dimensional Anderson model : weak disorder expansions , 1984 .