λ-Toeplitz operators with analytic symbols

Abstract

Let λ be a complex number in the closed unit disc D, and H be a separable Hilbert space with the orthonormal basis, say, E=\en:n=0,1,2,·s\. A bounded operator T on H is called a λ-Toeplitz operator if Tem+1,en+1=λ Tem,en (where ·,· is the inner product on H). The subject arises naturally as the "eigenoperators" of the map \[ φ(A)=S*AS \] on the B( H), the space of bounded operators on H, where S is the unilateral shift on Sen=en+1. In this paper, we study the essential spectra for λ-Toeplitz operators when |λ|=1, and we will use the results to determine the spectra of certain weighted composition operators on Hardy spaces.