A counterexample to the Berger--Coburn conjecture

Abstract

Berger and Coburn proposed an endpoint boundedness criterion for Toeplitz operators on the Bargmann--Fock space in which the decisive quantity is the heat transform of the symbol at the borderline time t=14, the time naturally singled out by the Weyl calculus under the Bargmann transform. We show that this criterion fails for general measurable symbols in every complex dimension n 1. Concretely, we construct a measurable symbol g∈ L2( Cn,dμ) such that gka∈ L2(dμ) for every normalized reproducing kernel ka, and the associated Toeplitz form extends to a bounded operator on H2( Cn,dμ), but the heat transform g(1/4) is unbounded on Cn. The example is obtained by summing translated bounded "blocks" whose Toeplitz norms are summable while their t=14 heat profiles have fixed size. The blocks are produced by combining a Hilbert--Schmidt estimate for Weyl quantization with the Bargmann correspondence between Weyl and Toeplitz operators.