Abelianization of some groups of interval exchanges

Abstract

Let IET be the group of bijections from [0,1 [ to itself that are continuous outside a finite set, right-continuous and piecewise translations. The abelianization homomorphism f: IET A, called SAF-homomorphism, was described by Arnoux-Fathi and Sah. The abelian group A is the second exterior power of the reals over the rationals. For every subgroup of R/Z we define IET() as the subgroup of IET consisting of all elements f such that f is continuous outside . Let be the preimage of in R. We establish an isomorphism between the abelianization of IET() and the second skew-symmetric power of over Z denoted by \!\!2Z . This group often has non-trivial 2-torsion, which is not detected by the SAF-homomorphism. We then define IET the group of all interval exchange transformations with flips. Arnoux proved that this group is simple thus perfect. However for every subgroup IET() we establish an isomorphism between its abelianization and a a ~ [mod~2] a ∈ × ~ [mod~2] ∈ which is a 2-elementary abelian subgroup of 2Z / (22Z ) × \!\!2Z / (2 \!\!2Z ).