English

Isomorphisms preserving invariants

Representation Theory 2009-03-06 v2 Group Theory

Abstract

Let VV and WW be finite dimensional real vector spaces and let G\GL(V)G\subset\GL(V) and H\GL(W)H\subset\GL(W) be finite subgroups. Assume for simplicity that the actions contain no reflections. Let YY and ZZ denote the real algebraic varieties corresponding to R[V]G\R[V]^G and R[W]H\R[W]^H, respectively. If VV and WW are quasi-isomorphic, i.e., if there is a linear isomorphism L ⁣:VWL\colon V\to W such that LL sends GG-orbits to HH-orbits and L\invL\inv sends HH-orbits to GG-orbits, then LL induces an isomorphism of YY and ZZ. Conversely, suppose that f ⁣:YZf\colon Y\to Z is a germ of a diffeomorphism sending the origin of YY to the origin of ZZ. Then we show that VV and WW are quasi-isomorphic, This result is closely related to a theorem of Strub \cite{Strub}, for which we give a new proof. We also give a new proof of a result of \cite{KrieglLosikMichor03} on lifting of biholomorphisms of quotient spaces.

Keywords

Cite

@article{arxiv.0804.3363,
  title  = {Isomorphisms preserving invariants},
  author = {Gerald W. Schwarz},
  journal= {arXiv preprint arXiv:0804.3363},
  year   = {2009}
}

Comments

Minor changes, 6 pages

R2 v1 2026-06-21T10:33:13.230Z