The structure of group preserving operators

Abstract

In this paper, we prove the existence of a particular diagonalization for normal bounded operators defined on subspaces of L2(S) where S is a second countable LCA group. The subspaces where the operators act are invariant under the action of a group which is a semi-direct product of a uniform lattice of S with a discrete group of automorphisms. This class includes the crystal groups which are important in applications as models for images. The operators are assumed to be preserving. i.e. they commute with the action of . In particular we obtain a spectral decomposition for these operators. This generalizes recent results on shift-preserving operators acting on lattice invariant subspaces where S is the Euclidean space.