Closed sets with the Kakeya property
Abstract
We say that a planar set A has the Kakeya property if there exist two different positions of A such that A can be continuously moved from the first position to the second within a set of arbitrarily small area. We prove that if A is closed and has the Kakeya property, then the union of the nontrivial connected components of A can be covered by a null set which is either the union of parallel lines or the union of concentric circles. In particular, if A is closed, connected and has the Kakeya property, then A can be covered by a line or a circle.
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