arXiv:2301.07589 Abstract | arXiv Analytics

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On groups whose cogrowth series is the diagonal of a rational series

Published 2023-01-18Version 1

We show that if a group contains $\mathbb{Z}^n \times F_m$ as a finite-index subgroup, then its cogrowth series is the diagonal of a rational function for every generating set. This answers a question of Pak and Soukup on the cogrowth of virtually abelian groups; and generalises a result by Elder, Rechnitzer, Janse van Rensburg, and Wong on the cogrowth series of the Baumslag-Solitar groups $\mathrm{BS}(N,N)$.

Comments: 16 pages

Categories: math.GR

Subjects: 20F65, 68R15, 05A15, 20K35

Keywords: cogrowth series, rational series, janse van rensburg, baumslag-solitar groups, finite-index subgroup

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