Random walks on symmetric spaces and inequalities for matrix spectra

Klyachko, A.A.

Random walks on symmetric spaces and inequalities for matrix spectra

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Random walks on symmetric spaces and inequalities for matrix spectra.pdf (178.74 KB)

Date

2000

Authors

Klyachko, A.A.

Source Title

Linear Algebra and Its Applications

Print ISSN

243795

Volume

319

Issue

1-3

Pages

37 - 59

Language

English

Type

Article

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Abstract

Using harmonic analysis on symmetric spaces we reduce the singular spectral problem for products of matrices to the recently solved spectral problem for sums of Hermitian matrices. This proves R.C. Thompson's conjecture [Matrix Spectral Inequalities, Johns Hopkins University Press, Baltimore, MD, 1988]. © 2000 Elsevier Science Inc.

Keywords

Eigenvalues, Random walks, Singular values, Spherical functions

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http://hdl.handle.net/11693/24979

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Random walks on symmetric spaces and inequalities for matrix spectra

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