Accessibility of countable sets in plane embeddings of arc-like continua

Abstract

We consider the problem of finding embeddings of arc-like continua in the plane for which each point in a given subset is accessible. We establish that, under certain conditions on an inverse system of arcs, there exists a plane embedding of the inverse limit for which each point of a given countable set is accessible. As an application, we show that for any Knaster continuum K, and any countable collection C of composants of K, there exists a plane embedding of K in which every point in the union of the composants in C is accessible. We also exhibit new embeddings of the Knaster buckethandle continuum K in the plane which are attractors of plane homeomorphisms, and for which the restriction of the plane homeomorphism to the attractor is conjugate to a power of the standard shift map on K.

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