Between homeomorphism type and Tukey type

Abstract

Call a compact space X pin homogeneous if every two points a,b are pin equivalent, meaning that there exists a compact space Y, a quotient map f Y X, and a homeomorphism g Y Y such that gf-1\a\=f-1\b\. We will prove a representation theorem for pin equivalence; transitivity of pin equivalence will be a corollary. Pin homogeneity is strictly weaker than homogeneity and pin equivalence is strictly stronger than Tukey equivalence. Just as with topological homogeneity, no infinite compact F-space is pin homogeneous. On the other hand, X× 2(X) is pin homogeneous for every compact X. And there is a compact pin homogeneous space with points of different π-character.