Packing and covering with balls on Busemann surfaces

Abstract

In this note we prove that for any compact subset S of a Busemann surface ( S,d) (in particular, for any simple polygon with geodesic metric) and any positive number δ, the minimum number of closed balls of radius δ with centers at S and covering the set S is at most 19 times the maximum number of disjoint closed balls of radius δ centered at points of S: (S) (S) 19(S), where (S) and (S) are the covering and the packing numbers of S by δ-balls.