Polynomiality of the faithful dimension of nilpotent groups over finite truncated valuation rings

Abstract

The faithful dimension of a finite group G over C, denoted by mfaithful( G), is the smallest integer n such that G can be embedded in GLn( C). Continuing our previous work (arXiv:1712.02019), we address the problem of determining the faithful dimension of a finite p-group of the form GR:=( gR) associated to gR:= g Z R in the Lazard correspondence, where g is a nilpotent Z-Lie algebra and R ranges over finite truncated valuation rings. Our first main result is that if R is a finite field with pf elements and p is sufficiently large, then mfaithful( GR)=fg(pf) where g(T) belongs to a finite list of polynomials g1,…,gk, with non-negative integer coefficients. The list of polynomials is uniquely determined by the Lie algebra g. Furthermore, for 1≤ i≤ k the set of pairs (p,f) for which g=gi is a finite union of Cartesian products P× F, where P is a Frobenius set of prime numbers and F is a subset of N that belongs to the Boolean algebra generated by arithmetic progressions. Next we formulate a conjectural polynomiality property for mfaithful( GR) in the more general setting where R is a finite truncated valuation ring, and prove special cases of this conjecture. In particular, we show that for a vast class of Lie algebras g that are defined by partial orders, mfaithful( GR) is given by a single polynomial-type formula. Finally, we compute mfaithful( GR) precisely in the case where g is the free metabelian nilpotent Lie algebra of class c on n generators and R is a finite truncated valuation ring.