Polynomial functions for locally compact group actions

Abstract

Consider a locally compact group G and a locally compact space X. A local right action of G on X is a continuous map (x,p) x· p from an open subset of the Cartesian product X× G to X satisfying certain obvious properties. A global right action of G on X gives rise to a global left action of G on the space Cc(X) of continuous complex functions with compact support in X by the formula p\,· f:x f(x· p). In the case of a local action, one still can define p\,· f in Cc(X) by this formula for f∈ Cc(X) and p in a neighborhood Vf of the identity in G. This yields a local left action of G on Cc(X). Given a local right action of G on X, a function f∈ Cc(X) is called polynomial if there is a neighborhood V of the identity, contained in Vf, and a finite-dimensional subspace F of Cc(X) containing all the functions v· f for v∈ V. In this paper we study such polynomial functions. If G acts on itself by multiplication, we are also interested in the local actions obtained by restricting it to an open subset of G. This is the typical situation that is encountered in our paper on bicrossproducts of groups with a compact open subgroup. In fact, the need for a better understanding of polynomial functions for that case has led us to develop the theory in general here.