Ergodic measures on infinite skew-symmetric matrices over non-Archimedean local fields

Abstract

Let F be a non-discrete non-Archimedean locally compact field such that the characteristic ch(F) 2 and let OF be the ring of integers in F. The main results of this paper are Theorem 1.2 that classifies ergodic probability measures on the space Skew(N, F) of infinite skew-symmetric matrices with respect to the natural action of the group GL(∞,OF) and Theorem 1.4, that gives an unexpected natural correspondence between the set of GL(∞,OF)-invariant Borel probability measures on Sym(N, F) with the set of GL(∞,OF) × GL(∞,OF)-invariant Borel probability measures on the space Mat(N, F) of infinite matrices over F.