Isomorphisms preserving invariants
Abstract
Let and be finite dimensional real vector spaces and let and be finite subgroups. Assume for simplicity that the actions contain no reflections. Let and denote the real algebraic varieties corresponding to and , respectively. If and are quasi-isomorphic, i.e., if there is a linear isomorphism such that sends -orbits to -orbits and sends -orbits to -orbits, then induces an isomorphism of and . Conversely, suppose that is a germ of a diffeomorphism sending the origin of to the origin of . Then we show that and 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