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Spectral Asymptotics for Toeplitz Matrices Having Certain Piecewise Continuous Symbols

Functional Analysis 2018-07-05 v1

Abstract

The limiting behavior of the eigenvalues of the Toeplitz matrices Tn[σ]=(σ^(ij))T_{n}[\sigma]=(\hat{\sigma}(i-j)), where 0i,jn0\leq i,j \leq n, as nn \to \infty, is investigated in the case of complex valued functions σ\sigma defined on the unit circle T\mathbb{T} and having exactly one point of discontinuity. It is found that if σ(z)=(z)βτ(z)\sigma(z)=(-z)^{\beta}\tau(z), β\beta not an integer and τ\tau satisfying certain smoothness conditions, then detTn[σ]=G[τ]n+1nβ2E[τ,β](1+o(1))\det T_{n}[\sigma]=\mathbf{G}[\tau]^{n+1}n^{-\beta^{2}}E[\tau,\beta](1+o(1)) as nn \to \infty, where G[τ]\mathbf{G}[\tau] denotes the geometric mean of τ\tau and EE is a constant independent of nn. A value for EE is found in terms of the Fourier coefficients of τ\tau and an analytic function of β\beta. These results were known previously in the case that β\Re \beta, the real part of β\beta, was sufficiently small. A corollary of this result is a determination of the limiting set and limiting distributions for the eigenvalues of Tn[σ]T_{n}[\sigma].

Keywords

Cite

@article{arxiv.1807.01441,
  title  = {Spectral Asymptotics for Toeplitz Matrices Having Certain Piecewise Continuous Symbols},
  author = {Richard A. Libby},
  journal= {arXiv preprint arXiv:1807.01441},
  year   = {2018}
}

Comments

20 pages, 0 figures, presented at the Harold Widom Anniversary Workshop on Toeplitz and Wiener-Hopf Operators, Santa Cruz, California, September 1992

R2 v1 2026-06-23T02:50:12.706Z