New York Journal of Mathematics
Volume 1 (1994-1995) 75-96

  

Kent E. Morrison

Spectral Approximation of Multiplication Operators


Published: March 20, 1995
Keywords: Eigenvalues, spectrum, multiplication operators, Toeplitz matrices, Walsh functions
Subject: Primary: 47-02; Secondary: 15A60, 47-04, 47B35, 47B38, 65F15

Abstract
A linear operator on a Hilbert space may be approximated with finite matrices by choosing an orthonormal basis of the Hilbert space. For an operator that is not compact such approximations cannot converge in the norm topology on the space of operators. Multiplication operators on spaces of L2 functions are never compact; for them we consider how well the eigenvalues of the matrices approximate the spectrum of the multiplication operator, which is the essential range of the multiplier. The choice of the orthonormal basis strongly affects the convergence. Toeplitz matrices arise when using the Fourier basis of exponentials exp(ikθ). We also consider the basis of Legendre polynomials and the basis of Walsh functions.

Author information

Department of Mathematics, California Polytechnic State University, San Luis Obispo, CA 93407
kmorriso@oboe.calpoly.edu