Random Walks on Homogeneous Spaces by Sparse Solvable Measures
Abstract
The paper analyzes a specific class of random walks on quotients of for a lattice . Consider a one parameter diagonal subgroup, , with an associated abelian expanding horosphere, , and let be a sufficiently smooth curve satisfying the condition that that the derivative of spends time in any one subspace of . Let be the measure defined as where is the Lebesgue measure on . Let be a measure on the full diagonal subgroup of , such that almost surely the random walk on the diagonal subgroup with respect to this measure grows exponentially in the direction of the cone expanding . Then the random walk starting at any point , and alternating steps given by and equidistributes respect to -invariant measure on . Furthermore, the measure defined by converges exponentially fast to the -invariant measure on .
Cite
@article{arxiv.1510.02722,
title = {Random Walks on Homogeneous Spaces by Sparse Solvable Measures},
author = {C. Davis Buenger},
journal= {arXiv preprint arXiv:1510.02722},
year = {2015}
}