On hyperspaces of knots and planar simple closed curves
Abstract
We consider the Vietoris hyperspaces S( Rn) of simple closed curves in Rn, n=2,3, and their subspaces SP( R2) of planar simple closed polygons, KP of polygonal knots, and KT of tame knots. We prove that all the hyperspaces are strongly locally contractible, arcwise connected, infinite-dimensional Cantor manifolds, and S( R2) and KT are strongly infinite-dimensional Cantor manifolds. Moreover, SP( R2) and KP are σ-compact, strongly countable-dimensional absolute neighborhood retracts.
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