English

Random Walks on Homogeneous Spaces by Sparse Solvable Measures

Dynamical Systems 2015-10-12 v1

Abstract

The paper analyzes a specific class of random walks on quotients of X:=SL(k,R)/ΓX:=\text{SL}(k,{\Bbb R})/ \Gamma for a lattice Γ\Gamma. Consider a one parameter diagonal subgroup, {gt}\{g_t\}, with an associated abelian expanding horosphere, URkU\cong {\Bbb R}^k, and let ϕ:[0,1]U\phi:[0,1]\rightarrow U be a sufficiently smooth curve satisfying the condition that that the derivative of ϕ\phi spends 00 time in any one subspace of Rk{\Bbb R}^k. Let μU \mu_U be the measure defined as ϕλ[0,1],\phi_*\lambda_{[0,1]}, where λ[0,1]\lambda_{[0,1]} is the Lebesgue measure on [0,1][0,1]. Let μA\mu_A be a measure on the full diagonal subgroup of SL(k,R)\text{SL}(k,{\Bbb R}), such that almost surely the random walk on the diagonal subgroup AA with respect to this measure grows exponentially in the direction of the cone expanding UU. Then the random walk starting at any point zXz\in X, and alternating steps given by μU\mu_U and μA\mu_A equidistributes respect to SL(k,R)\text{SL}(k,{\Bbb R})-invariant measure on XX. Furthermore, the measure defined by μAμUμAμUδz\mu_A*\mu_U*\dots*\mu_A* \mu_U*\delta_z converges exponentially fast to the SL(k,R)\text{SL}(k,{\Bbb R})-invariant measure on XX.

Keywords

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}
}
R2 v1 2026-06-22T11:16:41.955Z