Power maps on General Linear groups over finite principal ideal local rings of length two

Abstract

Word maps have been studied for matrix groups over a field. We initiate the study of problems related to word maps in the context of the group GLn( O2), where O2 is a finite local principal ideal ring of length two (e.g. Z/p2Z and Fq[t]/ t2). We study the power map g gL, where L is a positive integer. We consider L to be coprime to p (an odd prime), the characteristic of the residue field k of O2. We classify all the elements in the image, whose mod- m reduction in GLn(k) are either regular semisimple or cyclic, where m is the unique maximal ideal of O2. Our main tool is a Hensel lifting for polynomial equations over Mn( O2), which we establish in this work. A central contribution of this work is the construction of canonical forms for certain natural classes of matrices over O2. As applications, we derive explicit generating functions for the probabilities that a random element of GLn( O2) is regular semisimple, L-power regular semisimple, compatible cyclic, or L-power compatible cyclic.