Coverings by convex bodies and inscribed balls
Abstract
Let H be a Hilbert space. For a closed convex body A denote by r(A) the supremum of radiuses of balls, contained in A. We prove, that Σn=1∞ r(An) r(A) for every covering of a convex closed body A ⊂ H by a sequence of convex closed bodies An, n ∈ . It looks like this fact is new even for triangles in a 2-dimensional space.
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