Cross-Toeplitz Operators on the Fock--Segal--Bargmann Spaces and Two-Sided Convolutions on the Heisenberg Group

TL;DR

This paper extends the class of cross-Toeplitz operators acting between different Fock--Segal--Bargmann spaces, representing them via two-sided convolutions on the Heisenberg group, and explores their connections to various operator theories.

Contribution

It introduces a novel framework for cross-Toeplitz operators using two-sided convolutions on the Heisenberg group, linking them to representation theory and time-frequency analysis.

Findings

Representation of cross-Toeplitz as two-sided convolutions

Reduction to one-sided convolutions on doubled Heisenberg group

Connections to pseudo-differential and localization operators

Abstract

We introduce an extended class of cross-Toeplitz operators which act between Fock--Segal--Bargmann spaces with different weights. It is natural to consider these operators in the framework of representation theory of the Heisenberg group. Our main technique is representation of cross-Toeplitz by two-sided relative convolutions from the Heisenberg group. In turn, two-sided convolutions are reduced to usual (one-sided) convolutions on the Heisenberg group of the doubled dimensionality. This allows us to utilise the powerful group-representation technique of coherent states, co- and contra-variant transforms, twisted convolutions, symplectic Fourier transform, etc.We discuss connections of (cross-)Toeplitz operators with pseudo-differential operators, localisation operators in time-frequency analysis, and characterisation of kernels in terms of ladder operators. The paper is written in detailed and reasonably self-contained manner to be suitable as an introduction into group-theoretical methods in phase space and time-frequency operator theory.