Maximal subgroup growth of a few polycyclic groups
Abstract
We give here the exact maximal subgroup growth of two classes of polycyclic groups. Let Gk = x1, x2, ..., xk xixjxi-1xj for all i < j . So Gk = Z (Z (Z ... Z). Then for all k ≥ 2, we calculate mn(Gk), the number of maximal subgroups of Gk of index n, exactly. Also, for infinitely many groups Hk of the form Z2 G2, we calculate mn(Hk) exactly.
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