On finite groups isospectral to simple classical groups
Abstract
The spectrum of a finite group is the set of element orders of . Finite groups and are isospectral if their spectra coincide. Suppose that is a simple classical group of sufficiently large dimension (the lower bound varies for different types of groups but is at most 62) defined over a finite field of characteristic . It is proved that a finite group isospectral to cannot have a nonabelian composition factor which is a group of Lie type defined over a field of characteristic distinct from . Together with a series of previous results this implies that every finite group isospectral to is `close' to . Namely, if is a linear or unitary group, then , in particular, there are only finitely many such groups for given . If is a symplectic or orthogonal group, then has a unique nonabelian composition factor and, for given , there are at most 3 variants for (including ).
Cite
@article{arxiv.1405.4374,
title = {On finite groups isospectral to simple classical groups},
author = {Andrey Vasil'ev},
journal= {arXiv preprint arXiv:1405.4374},
year = {2014}
}
Comments
70 pages