Danzer set
= Danzer set
{wiki=Danzer_set}
A Danzer set is a concept from the field of discrete geometry, specifically relating to the arrangement of points in Euclidean space. It is named after the mathematician Ludwig Danzer, who studied these configurations. A Danzer set in the Euclidean space \\( \\mathbb\{R\}^n \\) is defined as a set of points with the property that any bounded convex set in \\( \\mathbb\{R\}^n \\) contains at least one point from the Danzer set.