Empty Rectangles and Graph Dimension
Abstract
We consider rectangle graphs whose edges are defined by pairs of points in diagonally opposite corners of empty axis-aligned rectangles. The maximum number of edges of such a graph on n points is shown to be 1/4 n2 +n -2. This number also has other interpretations: * It is the maximum number of edges of a graph of dimension 34, i.e., of a graph with a realizer of the form π1,π2,π1,π2. * It is the number of 1-faces in a special Scarf complex. The last of these interpretations allows to deduce the maximum number of empty axis-aligned rectangles spanned by 4-element subsets of a set of n points. Moreover, it follows that the extremal point sets for the two problems coincide. We investigate the maximum number of of edges of a graph of dimension 34, i.e., of a graph with a realizer of the form π1,π2,π3,π3. This maximum is shown to be 1/4 n2 + O(n). Box graphs are defined as the 3-dimensional analog of rectangle graphs. The maximum number of edges of such a graph on n points is shown to be 7/16 n2 + o(n2).
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