Rigidity times for weakly mixing dynamical system which are not rigidity times for any irrational rotation

Abstract

We construct an increasing sequence of natural numbers (mn)n=1+∞ with the property that (mn [1])n≥ 1 is dense in for any ∈ , and a continuous measure on the circle μ such that n +∞∫\|mnθ\|dμ(θ)=0. Moreover, for every fixed k∈ , the set \n∈ :\,k mn \ is infinite. This is a sufficient condition for the existence of a rigid, weakly mixing dynamical system whose rigidity time is not a rigidity time for any system with a discrete part in its spectrum.