Maximal subgroup growth of some metabelian groups

Abstract

Let mn(G) denote the number of maximal subgroups of G of index n. An upper bound is given for the degree of maximal subgroup growth of all polycyclic metabelian groups G (i.e., for mn(G) n, the degree of polynomial growth of mn(G)). A condition is given for when this upper bound is attained. For G = Zk Z, where A ∈ GL(k,Z), it is shown that mn(G) grows like a polynomial of degree equal to the number of blocks in the rational canonical form of A. The leading term of this polynomial is the number of distinct roots (in C) of the characteristic polynomial of the smallest block.