Multipliers and Disjointness from Mixing

Abstract

In 2005, Parreau proved that if a measure preserving system is not strongly mixing then it contains a non-trivial factor that is disjoint from every strongly mixing system. Taking this construction as the starting point, we develop the complementary notions of U-generated and U-mixing systems, for a set U of ultrafilters, and use them to recover several classical results in ergodic theory as special cases of a unified framework. We prove that a system is U-mixing if and only if it is disjoint from all U-generated systems. In fact, we show that if Y is a U-generated system and Z is disjoint from every U-mixing system, then any joining of Y and Z remains disjoint from all U-mixing systems. We also show that every partially rigid system is a finite extension of some U-generated system.