The metaplectic action on modulation spaces

TL;DR

This paper characterizes when metaplectic operators act boundedly and as automorphisms on modulation spaces, providing criteria for polynomially bounded weights, which advances understanding of their mapping properties in harmonic analysis.

Contribution

It offers a complete characterization of the boundedness and well-definedness of metaplectic operators on modulation spaces, including criteria for weighted spaces with polynomial weights.

Findings

Metaplectic operators are Banach space automorphisms on certain modulation spaces.

Boundedness and well-definedness are equivalent for these operators.

Provides criteria for weighted modulation spaces with polynomial weights.

Abstract

We study the mapping properties of metaplectic operators $\widehat{S}\in \mathrm{Mp}(2d,\mathbb{R})$ on modulation spaces of the type $\mathrm{M}^{p,q}_m(\mathbb{R}^d)$. Our main result is a full characterisation of the pairs $(\widehat{S},\mathrm{M}^{p,q}(\mathbb{R}^d))$ for which the operator $\widehat{S}:\mathrm{M}^{p,q}(\mathbb{R}^d) \to \mathrm{M}^{p,q}(\mathbb{R}^d)$ is (i) well-defined, (ii) bounded. It turns out that these two properties are equivalent, and they entail that $\widehat{S}$ is a Banach space automorphism. For polynomially bounded weight functions, we provide a simple sufficient criterion to determine whether the well-definedness (boundedness) of ${\widehat{S}:\mathrm{M}^{p,q}{}(\mathbb{R}^d)\to \mathrm{M}^{p,q}(\mathbb{R}^d)}$ transfers to $\widehat{S}:\mathrm{M}^{p,q}_m(\mathbb{R}^d)\to \mathrm{M}^{p,q}_m(\mathbb{R}^d)$.