On geometric properties of sets of positive reach in Ed

Abstract

Some geometric facts concerning sets with positive reach in the Euclidean d-dimensional space Ed are proved. For x1 and x2 in Ed and R>0 let us denote by H(x1,x2,R) the intersection of all closed balls of radius R containing x1 and x2. For a compact subset K of bf Ed we prove that reach(K) R if and only if for every x1,x2∈ K such that x1-x2< 2R, H(x1,x2,R) K is connected. A corollary is that if reach(K) R>0 and D is a closed ball of radius less than or equal to R (intersecting K) then reach(K D) R. We also give a necessary and sufficient condition such that A⊂ Ed admits a minimal cover (with respect to inclusion) of reach R.

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