Homotopy principles for equivariant isomorphisms
Abstract
Let be a reductive complex Lie group acting holomorphically on Stein manifolds and . Let and be the quotient mappings. When is there an equivariant biholomorphism of and ? A necessary condition is that the categorical quotients and are biholomorphic and that the biholomorphism sends the Luna strata of isomorphically onto the corresponding Luna strata of . Fix . We demonstrate two homotopy principles in this situation. The first result says that if there is a -diffeomorphism , inducing , which is -biholomorphic on the reduced fibres of the quotient mappings, then is homotopic, through -diffeomorphisms satisfying the same conditions, to a -equivariant biholomorphism from to . The second result roughly says that if we have a -homeomorphism which induces a continuous family of -equivariant biholomorphisms of the fibres and for and if satisfies an auxiliary property (which holds for most ), then is homotopic, through -homeomorphisms satisfying the same conditions, to a -equivariant biholomorphism from to . Our results improve upon earlier work of the authors and use new ideas and techniques.
Cite
@article{arxiv.1503.00797,
title = {Homotopy principles for equivariant isomorphisms},
author = {Frank Kutzschebauch and Finnur Larusson and Gerald W. Schwarz},
journal= {arXiv preprint arXiv:1503.00797},
year = {2017}
}
Comments
51 pages, minor corrections in section 3. Final version, to appear in Transactions of the AMS