A criterion for weak mixing of induced interval exchange transformations

Abstract

Let f X X, X=[0,1), be an ergodic IET (interval exchange transformation) relative to the Lebesgue measure on X. Denote by ft Xt Xt the IET obtained by inducing f to the subinterval X=[0,t), 0<t<1. We show that \[ \0<t<1 ft is weakly mixing\ \] is a residual subset of X of full Lebesgue measure. The result is proved by establishing a generic Diophantine sufficient condition on t for ft to be weakly mixing.