English

Sobolev Lifting over Invariants

Classical Analysis and ODEs 2021-04-13 v4 Differential Geometry Functional Analysis Representation Theory

Abstract

We prove lifting theorems for complex representations VV of finite groups GG. Let σ=(σ1,,σn)\sigma=(\sigma_1,\dots,\sigma_n) be a minimal system of homogeneous basic invariants and let dd be their maximal degree. We prove that any continuous map f ⁣:RmV\overline{f} \colon {\mathbb R}^m \to V such that f=σff = \sigma \circ \overline{f} is of class Cd1,1C^{d-1,1} is locally of Sobolev class W1,pW^{1,p} for all 1p<d/(d1)1 \le p<d/(d-1). In the case m=1m=1 there always exists a continuous choice f\overline{f} for given f ⁣:Rσ(V)Cnf\colon {\mathbb R} \to \sigma(V) \subseteq {\mathbb C}^n. We give uniform bounds for the W1,pW^{1,p}-norm of f\overline{f} in terms of the Cd1,1C^{d-1,1}-norm of ff. The result is optimal: in general a lifting f\overline{f} cannot have a higher Sobolev regularity and it even might not have bounded variation if ff is in a larger H\"older class.

Keywords

Cite

@article{arxiv.2003.01967,
  title  = {Sobolev Lifting over Invariants},
  author = {Adam Parusiński and Armin Rainer},
  journal= {arXiv preprint arXiv:2003.01967},
  year   = {2021}
}
R2 v1 2026-06-23T14:03:26.525Z