Representation Growth

Abstract

The main results in this thesis deal with the representation growth of certain classes of groups. In chapter 1 we present the required preliminary theory. In chapter 2 we introduce the Congruence Subgroup Problem for an algebraic group G defined over a global field k. In chapter 3 we consider =G(OS) an arithmetic subgroup of a semisimple algebraic k-group for some global field k with ring of S-integers OS. If the Lie algebra of G is perfect, Lubotzky and Martin showed that if has the weak Congruence Subgroup Property then has Polynomial Representation Growth, that is, rn()≤ p(n) for some polynomial p. By using a different approach, we show that the same holds for any semisimple algebraic group G including those with a non-perfect Lie algebra. In chapter 4 we show that if has the weak Congruence Subgroup Property then sn()≤ nD n for some constant D, where sn() denotes the number of subgroups of of index at most n. In chapter 5 we consider =1+J, where J is a finite nilpotent associative algebra, this is called an algebra group. We provide counterexamples for any prime p for the Fake Degree Conjecture by looking at groups of the form =1+IFq, where IFq is the augmentation ideal of the group algebra Fq[π] for some p-group π. Moreover, we show that for such groups r1()=qK(π)-1|B0(π)|, where B0(π) is the Bogomolov multiplier of π. Finally in chapter 6, we consider =Πi∈ I Si, where the Si are nonabelian finite simple group. We show that within this class one can obtain any rate of representation growth, i.e., for any α>0 there exists =Πi∈ ISi such that rn() nα.