Twisted Conjugacy in Linear Algebraic Groups II
Abstract
Let be a linear algebraic group over an algebraically closed field and the group of all algebraic group automorphisms of . For every let denote the set of all orbits of the -twisted conjugacy action of on itself (given by , for all ). We say that has the algebraic -property if is infinite for every . In \citep{bb} we have shown that this property is satisfied by every connected non-solvable algebraic group. From a theorem due to Steinberg it follows that if a connected algebraic group has the algebraic -property, then (the fixed-point subgroup of under ) is infinite for all . In this article we show that the condition is also sufficient. We also show that a Borel subgroup of any semisimple algebraic group has the algebraic -property and identify certain classes of solvable algebraic groups for which the property fails.
Cite
@article{arxiv.2106.04242,
title = {Twisted Conjugacy in Linear Algebraic Groups II},
author = {Sushil Bhunia and Anirban Bose},
journal= {arXiv preprint arXiv:2106.04242},
year = {2022}
}
Comments
25 pages