Rationality of representation zeta functions of compact p-adic analytic groups

Abstract

We prove that for any FAb compact p-adic analytic group G, its representation zeta function is a finite sum of terms ni-sfi(p-s), where ni are natural numbers and fi(t)∈Q(t) are rational functions. Meromorphic continuation and rationality of the abscissa of the zeta function follow as corollaries. If G is moreover a pro-p group, we prove that its representation zeta function is rational in p-s. These results were proved by Jaikin-Zapirain for p>2 or for G uniform and pro-2, respectively. We give a new proof which avoids the Kirillov orbit method and works for all p. First part of arXiv:2007.10694, second part uploaded as a separate paper.