Random walks, word metric and orbits distribution on the plane

Abstract

Given a countably infinite group G acting on some space X, an increasing family of finite subsets Gn and x∈ X, a natural question to ask is what asymptotical distribution the sets Gnx form. More formally, we define for a function f over X the sums Sn(f,x)=Σg∈ Gnf(gx) and ask whether exists a function (n):N such that the sequence (n)Sn(f,x) converges. This is a delicate problem that was studied under various settings. We first show a full solution when elements are chosen using a carefully chosen word metric from a specific lattice in SL(2,Z) acting on the circle. In addition, it is proven that the resulting measure is stationary with respect to a certain random walk and has a tight connection to a well studied function from the field of Diophantine approximations. We then proceed to study the asymptotic distribution problem when elements are chosen using a random walk over SL(2,R) acting on R2. We offer a variant of our initial problem which yields some surprising and interesting results.