Continuously homogeneous hereditarily indecomposable continua are tree-like
Abstract
A topological space X is continuously homogeneous if for any x,y∈ X there exists a continuous surjection f:X X with f(x)=y. We show that continuously homogeneous hereditarily indecomposable continua are tree-like, therefore, extending results of Bing and Rogers for homeomorphism and a result of Sturm for the pseudo-circle and pseudo-solenoids. This also provides a partial answer to the question of Lewis whether all continuously homogeneous hereditarily indecomposable continua are homogeneous.
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