Boundedness and compactness of composition operators on Segal-Bargmann spaces

TL;DR

This paper characterizes when composition operators on Segal-Bargmann spaces over Hilbert spaces are bounded or compact, extending finite-dimensional results to infinite-dimensional settings.

Contribution

It provides necessary and sufficient conditions for boundedness and compactness of composition operators on infinite-dimensional Segal-Bargmann spaces, generalizing previous finite-dimensional results.

Findings

Characterization of bounded composition operators

Criteria for compactness of these operators

Extension of finite-dimensional results to infinite-dimensional spaces

Abstract

For $E$ a Hilbert space, let $\mathcal{H}(E)$ denote the Segal-Bargmann space (also known as the Fock space) over $E$, which is a reproducing kernel Hilbert space with kernel $K(x,y)=\exp(< x,y>)$ for $x,y$ in $E$. If $\phi$ is a mapping on $E$, the composition operator $C_{\phi}$ is defined by $C_{\phi}h = h\circ\phi$ for $h\in \mathcal{H}(E)$ for which $h\circ\phi$ also belongs to $\mathcal{H}(E)$. We determine necessary and sufficient conditions for the boundedness and compactness of $C_{\phi}$. Our results generalize results obtained earlier by Carswell, MacCluer and Schuster for finite dimensional spaces $E$.