Embedding irreducible connected sets

Abstract

We show that every connected set X which is irreducible between two points a and b embeds into the Hilbert cube in a way that X \c\ is irreducible between a and b for every point c in the closure of X. Also, a connected set X is indecomposable if and only if for every compactum Y⊃eq X and a∈ X there are two points b and c in the closure of X such that X \b,c\ is irreducible between every two points from \a,b,c\. Following the proofs of these theorems, we illustrate a cube embedding of the main example from "On indecomposability of β X". We prove the example embeds into the plane.