Toeplitz operators on the Fock space via the Fourier transform

Abstract

In sprite by Berger-Coburn theorems and their conjecture in Coburn1994, we use the Fourier transform to decompose Tg as an infinite sum of Toeplitz operators with symbols which have compact support in the frequency domain. As a consequence, we obtain a sufficient condition for Tg to be bounded in terms of the Carleson measure conditions defined by the heat transform of the symbol g. Moreover the decomposition of a Toeplitz operator leads us to get easily understanding that for a bounded function g, if its Berezin transform vanishes at infinity, then the Toeplitz operator Tg is compact Eng and the Toeplitz algebra generated by Toeplitz operators with symbols in L∞ is indeed generated by Toeplitz operators with symbols which on uniformly continuous on Cn Bauer2012.Further, we will apply our decomposition theory for a Toeplitz operator to estimate the Schatten p-norm of the product of two Toeplitz operators.