Max-Min theorems for weak containment, square summable homoclinic points, and completely positive entropy

Abstract: We prove a max-min theorem for weak containment in the context of algebraic actions. Namely, we show that given an algebraic action G X, there is a maximal, closed G-invariant subgroup Y of X so that G (Y, m Y ) is weakly contained in a Bernoulli shift. This subgroup is also the minimal closed subgroup so that any action weakly contained in a Bernoulli shift is G X/Y -ergodic "in the presence of G X". We give several applications, including a major simplification of the proof that measure entropy equals topolo… Show more