Twisted shift preserving operators on L2(R2n)

Abstract

We introduce the J map using the Zak transform associated with the Weyl transform on L2(R2n). We obtain a decomposition for a twisted shift-invariant subspace of L2(R2n) as a direct sum of mutually orthogonal principal twisted shift-invariant spaces such that the respective system of twisted translates forms a Parseval frame sequence. We establish that the twisted shift preserving operators and the corresponding range operators simultaneously share some properties in common, namely, self-adjoint, unitary, range of the spectrum and bounded below properties. We prove that the frame operator and its inverse associated with a system of twisted translates of ss∈ Z are shift preserving. We also show that the corresponding range operators turn out to be the dual Gramian and its inverse associated with the collection Js(. , .)s∈ Z.