On congruent isomorphisms for tori

Abstract

Let F and F' be two l-close nonarchimedean local fields, where l is a positive integer, and let T and T' be two tori over F and F', respectively, such that their cocharacter lattices can be identified as modules over the ''at most l-ramified'' absolute Galois group F/IFl F'/IF'l. In the spirit of the work of Kazhdan and Ganapathy, for every positive integer m relative to which l is large, we construct a congruent isomorphism T(F)/T(F)m'(F')/T'(F')m, where T(F)m and T(F')m are the minimal congruent filtration subgroups of T(F) and T(F'), respectively, defined by J.-K.~Yu. We prove that this isomorphism is functorial and compatible with both the isomorphism constructed by Chai and Yu and the Kottwitz homomorphism for tori. We show that, when l is even larger relative to m, it moreover respects the local Langlands correspondence for tori.