On the countable, measure preserving relation induced on an homogeneous quotient, by the action of a discrete group

Abstract

We consider a countable discrete group G acting ergodicaly and a.e. freely, by measure-preserving transformations, on an infinite measure space ( X,) with σ-finite measure . Let ⊂eq G be an almost normal subgroup with fundamental domain F⊂eq X of finite measure. Let RG be the countable measurable equivalence relation on X determined by the orbits of G. Let RG| F be its restriction to F. We find an explicit presentation, by generators and relations, for the von Neumann algebra associated, by the Feldman-Moore (FM) construction, to the relation RG|F. The generators of the relation RG|F are a set of transformations of the quotient space F X/ , in a one to one correspondence with the cosets of in G. We prove that the composition formula for these transformations is an averaged version, with coefficients in L∞(F,), of the Hecke algebra product formula (BC). In the situation G = PGL2( Z[1p]), =PSL2( Z), p≥ 3 prime number, the relation RG|F is the equivalence relation associated to a free, measure-preserving action of a free group on (p+1)/2 generators on F (Ad, Hj). We use the coset representations of the transformations generating RG|F to find a canonical treeing (Ga).