Shift-preserving maps on ω*

Abstract

The shift map σ on ω* is the continuous self-map of ω* induced by the function n n+1 on ω. Given a compact Hausdorff space X and a continuous function f: X → X, we say that (X,f) is a quotient of (ω*,σ) whenever there is a continuous surjection Q: ω* X such that Q σ = f Q. Our main theorem states that if the weight of X is at most 1, then (X,f) is a quotient of (ω*,σ) if and only if f is weakly incompressible (which means that no nontrivial open U ⊂eq X has f(U) ⊂eq U). Under CH, this gives a complete characterization of the quotients of (ω*,σ) and implies, for example, that (ω*,σ-1) is a quotient of (ω*,σ). In the language of topological dynamics, our theorem states that a dynamical system of weight 1 is an abstract ω-limit set if and only if it is weakly incompressible. We complement these results by proving (1) our main theorem remains true when 1 is replaced by any < p, (2) consistently, the theorem becomes false if we replace 1 by 2, and (3) OCA+MA implies that (ω*,σ-1) is not a quotient of (ω*,σ).