Equidistribution of mass for random processes on finite-volume spaces

Abstract

Let G be a real Lie group, ⊂eq G a lattice, and X=G/. We fix a probability measure μ on G and consider the left random walk induced on X. It is assumed that μ is aperiodic, has a finite first moment, spans a semisimple algebraic group without compact factors, and has two non mutually singular convolution powers. We show that for every starting point x∈ X, the n-th step distribution μn*δx of the walk weak- converges toward some homogeneous probability measure on X.

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