Small union with large set of centers

Abstract

Let T⊂ Rn be a fixed set. By a scaled copy of T around x∈ Rn we mean a set of the form x+rT for some r>0. In this survey paper we study results about the following type of problems: How small can a set be if it contains a scaled copy of T around every point of a set of given size? We will consider the cases when T is circle or sphere centered at the origin, Cantor set in R, the boundary of a square centered at the origin, or more generally the k-skeleton (0 k<n) of an n-dimensional cube centered at the origin or the k-skeleton of a more general polytope of Rn. We also study the case when we allow not only scaled copies but also scaled and rotated copies and also the case when we allow only rotated copies.