Ratner's property and mixing for special flows over two-dimensional rotations

Abstract

We consider special flows over two-dimensional rotations by (α,β) on 2 and under piecewise C2 roof functions f satisfying von Neumann's condition ∫2fx(x,y)\,dx\,dy≠ 0≠ ∫2fy(x,y)\,dx\,dy. Such flows are shown to be always weakly mixing and never partially rigid. For an uncountable set of (α,β) with both α and β of unbounded partial quotients the strong mixing property is proved to hold. It is also proved that while specifying to a subclass of roof functions and to ergodic rotations for which α and β are of bounded partial quotients the corresponding special flows enjoy so called weak Ratner's property. As a consequence, such flows turn out to be mildly mixing.