On special flows over IETs that are not isomorphic to their inverses

Abstract

In this paper we give a criterion for a special flow to be not isomorphic to its inverse which is a refine of a result in Fr-Ku-Le. We apply this criterion to special flows Tf built over ergodic interval exchange transformations T:[0,1)[0,1) (IETs) and under piecewise absolutely continuous roof functions f:[0,1)+. We show that for almost every IET T if f is absolutely continuous over exchanged intervals and has non-zero sum of jumps then the special flow Tf is not isomorphic to its inverse. The same conclusion is valid for a typical piecewise constant roof function.