Sobolev Lifting over Invariants

Abstract

We prove lifting theorems for complex representations V of finite groups G. Let σ=(σ1,…,σn) be a minimal system of homogeneous basic invariants and let d be their maximal degree. We prove that any continuous map f Rm V such that f = σ f is of class Cd-1,1 is locally of Sobolev class W1,p for all 1 p<d/(d-1). In the case m=1 there always exists a continuous choice f for given f R σ(V) ⊂eq Cn. We give uniform bounds for the W1,p-norm of f in terms of the Cd-1,1-norm of f. The result is optimal: in general a lifting f cannot have a higher Sobolev regularity and it even might not have bounded variation if f is in a larger H\"older class.