Characterizing chainable, tree-like, and circle-like continua

Abstract

We prove that a continuum X is tree-like (resp. circle-like, chainable) if and only if for each open cover 4=\U1,U2,U3,U4\ of X there is a 4-map f:X Y onto a tree (resp. onto the circle, onto the interval). A continuum X is an acyclic curve if and only if for each open cover 3=\U1,U2,U3\ of X there is a 3-map f:X Y onto a tree (or the interval [0,1]).