Uniform rationality of the Poincar\'e series of definable, analytic equivalence relations on local fields

Abstract

Poincar\'e series of p-adic, definable equivalence relations have been studied in various cases since Igusa's and Denef's work related to counting solutions of polynomial equations modulo pn for prime p. General semi-algebraic equivalence relations on local fields have been studied uniformly in p recently in 16. Here we generalize the rationality result of 16 to the analytic case, unifomly in p, building further on the appendix of 16 and on 13b, 03. In particular, the results hold for large positive characteristic local fields. We also introduce rational motivic constructible functions and their motivic integrals, as a tool to prove our main results.