Limit distributions of expanding translates of shrinking submanifolds and non-improvability of Dirichlet's approximation theorem

Abstract

On the space Ln+1 of unimodular lattices in Rn+1, we consider the standard action of a(t)=diag(tn,t-1,…,t-1)∈ SL(n+1,R) for t>1. Let M be a nondegenerate submanifold of an expanding horospherical leaf in Ln+1. We prove that for all x∈ M E and t>1, if μx,t denotes the normalized Lebesgue measure on the ball of radius t-1 around x in M, then the translated measure a(t)μx,t get equidistributed Ln+1 as t∞, where E is a union of countably many lower dimensional submanifolds of M. In particular, if μ is an absolutely continuous probability measure on M, then a(t)μ gets equidistributed in Ln+1 as t∞. This result implies the non-improvability of Dirichlet's Diophantine approximation theorem for almost every point on a Cn+1-submanifold of Rn satisfying a non-degeneracy condition, answering a question arising from the work of Davenport and Schmidt (1969).