Integer matrices with a given characteristic polynomial and multiplicative dependence of matrices

Abstract

We consider the set Mn( Z; H) of n× n-matrices with integer elements of size at most H and obtain a new upper bound on the number of matrices from Mn( Z; H) with a given characteristic polynomial f ∈ Z[X], which is uniform with respect to f. This complements the asymptotic formula of A. Eskin, S. Mozes and N. Shah (1996) in which f has to be fixed and irreducible. Using this result, among others, we obtain upper and lower bounds on the number of s-tuples of matrices from Mn( Z; H), satisfying various multiplicative relations, including multiplicative dependence and bounded generation of a subgroup of GLn( Q). These problems generalise those studied in the scalar case n=1 by F. Pappalardi, M. Sha, I. E. Shparlinski and C. L. Stewart (2018) with an obvious distinction due to the non-commutativity of matrices. Motivated by these problems, we also prove various properties of the variety of complex matrices with fixed characteristic polynomial, including computing the degree of this variety.