Periodic Points of Power Maps in Finite Matrix Groups and Algebras

Abstract

Consider the power map x xL for a prime L≠ 2 such that L|q-1 where q is a power of a prime. We determine the periodic points under this map for Mn(q), the algebra of n× n matrices over a finite field of order q, and also for the group GLn(q)=Mn(q)×. We compute the limit q ∞\L(q-1)=c|Per(xL,M(q))||M(q)| and consequently q ∞ vL(q-1)=c|Per(xL,GL(q))||GL(q)|, where vL denotes the L-adic valuation. We also compute the quantity q ∞ vL(q-1)=c|Per(xL,Sp2(q))||Sp2(q)| and q ∞ vL(q-1)=c|Per(xL,U(q))||U(q)|; turns out these two limiting values are same. In all the cases, it turns out that the regular semisimple elements play the role in determining the limiting values.

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