GL(n,Zp)-invariant Gaussian measures on the space of p-adic polynomials

Abstract

We prove that if p>d there is a unique gaussian distribution (in the sense of Evans) on the space Qp[x1, …, xn](d) which is invariant under the action of GL(n, Zp) by change of variables. This gives the nonarchimedean counterpart of Kostlan's Theorem on the classification of orthogonally (respectively unitarily) invariant gaussian measures on the space R[x1, …, xn](d) (respectively C[x1, …, xn](d)). More generally, if V is an n--dimensional vector space over a nonarchimedean local field K with ring of integers R, and if λ is a partition of an integer d, we study the problem of determining the invariant lattices in the Schur module Sλ(V) under the action of the group GL(n,R).