The metaplectic action on modulation spaces

Abstract

We study the mapping properties of metaplectic operators S∈ Mp(2d,R) on modulation spaces of the type Mp,qm(Rd). Our main result is a full characterisation of the pairs (S,Mp,q(Rd)) for which the operator S:Mp,q(Rd) Mp,q(Rd) is (i) well-defined, (ii) bounded. It turns out that these two properties are equivalent, and they entail that 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 S:Mp,q(Rd) Mp,q(Rd) transfers to S:Mp,qm(Rd) Mp,qm(Rd).

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