English

Linear maps preserving fibers

Group Theory 2011-11-10 v6 Representation Theory

Abstract

Let G\GL(V)G\subset\GL(V) be a complex reductive group where dimV<\dim V<\infty, and let π ⁣:V\quotVG\pi\colon V\to\quot VG be the categorical quotient. Let \NN:=π\invπ(0)\NN:=\pi\inv\pi(0) be the null cone of VV, let H0H_0 be the subgroup of \GL(V)\GL(V) which preserves the ideal \I\I of \NN\NN and let HH be a Levi subgroup of H0H_0 containing GG. We determine the identity component of HH. In many cases we show that H=H0H=H_0. For adjoint representations we have H=H0H=H_0 and we determine HH completely. We also investigate the subgroup GFG_F of \GL(V)\GL(V) preserving a fiber FF of π\pi when VV is an irreducible cofree GG-module.

Keywords

Cite

@article{arxiv.0709.2202,
  title  = {Linear maps preserving fibers},
  author = {Gerald W. Schwarz},
  journal= {arXiv preprint arXiv:0709.2202},
  year   = {2011}
}

Comments

8 Pages, corrected theorems, more examples

R2 v1 2026-06-21T09:17:26.281Z