Non-metric Rim-metrizable continua and unique hyperspace

Abstract

A class Λ of continua is said to be C-determined provided that if X, Y _ Λ and C(X) ≈ C(Y), then X ≈ Y. A continuum X has unique hyperspace provided that if Y is a continuum and C(X) ≈ C(Y), then X ≈ Y. In the realm of metric continua the following classes of continua are known to have unique hyperspace: hereditarily indecomposable continua, smooth fans (in the class of fans) and indecomposable continua whose proper and non-degenerate subcontinua are arcs. We prove that these classes have unique hyperspace in the realm of rim-metrizable non-metric continua. .