On spectral properties of compact Toeplitz operators on Bergman space with logarithmically decaying symbol and applications to banded matrices

Abstract

Let L2(D) be the space of measurable square-summable functions on the unit disk. Let L2a(D) be the Bergman space, i.e., the (closed) subspace of analytic functions in L2(D). P+ stays for the orthogonal projection going from L2(D) to L2a(D). For a function ∈ L∞(D), the Toeplitz operator T: L2a(D) L2a(D) is defined as T f=P+ f, f∈ L2a(D). The main result of this article are spectral asymptotics for singular (or eigen-) values of compact Toeplitz operators with logarithmically decaying symbols, that is (z)=1(eiθ)\, (1+(1/(1-r)))-γ, γ>0, where z=reiθ and 1 is a continuous (or piece-wise continuous) function on the unit circle. The result is applied to the spectral analysis of banded (including Jacobi) matrices.