Compactness of Semicommutators of Toeplitz operators -- a Characterization

Abstract

Let Tf denote the Toeplitz operator on the Hardy space H2(T) and let Tn(f) be the corresponding n × n Toeplitz matrix. In this paper, we characterize the compactness of the operators T|f|2-TfTf and T|f|2-TfTf, where f(z)=f(z-1), in terms of the convergence of the sequence \Tn(|f|2)-Tn(f)Tn(f)\ in the sense of singular value clustering. Hence we obtain a method to check the compactness of semicommutators of Toeplitz operators using the matrices obtained from the Fourier coefficients of the symbol function (Toeplitz matrices). The function space VMO L∞(T) is the largest C*-subalgebra of L∞(T) with the property that whenever f,g ∈ VMO L∞(T), Tfg-TfTg is compact. In this article, we obtain a characterization of VMO L∞(T) in terms of the convergence of \Tn(fg)-Tn(f)Tn(g)\ in the sense of singular value clustering. To be precise, VMO L∞(T) is the largest C*-subalgebra of L∞(T) with the property that whenever f,g ∈ VMO L∞(T), \Tn(fg)-Tn(f)Tn(g)\ converges in the sense of singular value clustering.

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