Rigidity, Generators and Homology of Interval Exchange Groups

Abstract

Let be a dense countable subgroup of R. Then, consider IE(); the group of piecewise linear bijections of [0,1] with finitely many angles, all in . We introduce and systematically study a family of partial transformation groupoids coming from inverse semigroups, G, that realise IE() as a topological full group. This new perspective on the groupoid models G of IE() allows us to better understand the underlying C*-algebras and to compute homology. We show that H*(G)=H*+1(). We show C*r(G) is classifiable in the sense of the Elliott classification program of C*-algebras. We then classify these groups via the Elliott invariant, showing IE() IE(') =' as subsets of R. We relate the K-Theory of the reduced C* -algebras to groupoid homology via Matui's HK Conjecture. We relate the homology of IE() to the homology of using the recent framework developed by Li. We investigate in greater detail three key cases, namely if ⊂ Q, if Zn, and if is a ring. For these three cases, we study homology in greater detail and find explicit generating sets.