Extending Characters of Fixed Point Algebras

Abstract

A dynamical system is a triple (A,G,α), consisting of a unital locally convex algebra A, a topological group G and a group homomorphism α:G→(A), which induces a continuous action of G on A. Further, a unital locally convex algebra A is called continuous inverse algebra, or CIA for short, if its group of units A× is open in A and the inversion :A×→ A×,\,\,\,a a-1 is continuous at 1A. For a compact manifold M, the Fr\'echet algebra of smooth functions C∞(M) is the prototype of such a continuous inverse algebra. We show that if A is a complete commutative CIA, G a compact group and (A,G,α) a dynamical system, then each character of B:=AG can be extended to a character of A. In particular, the natural map on the level of the corresponding spectra A→B, B is surjective.