Representation Complexity of Semi-algebraic Graphs

Abstract

The representation complexity of a bipartite graph G=(P,Q) is the minimum size Σi=1s (|Ai|+|Bi|) over all possible ways to write G as a (not necessarily disjoint) union of complete bipartite subgraphs G=i=1s Ai× Bi where Ai⊂ P, Bi⊂ Q for i=1,…, s. In this paper we prove that if G is semi-algebraic, i.e. when P is a set of m points in Rd1, Q is a set of n points in Rd2 and the edges are defined by some semi-algebraic relations, the representation complexity of G is O( md1d2-d2d1d2-1+ nd1d2-d1d1d2-1++m1++n1+) for arbitrarily small positive . This generalizes results by Apfelbaum-Sharir and Solomon-Sharir. As a consequence, when G is Ku,u-free for some positive integer u, its number of edges is O(u md1d2-d2d1d2-1+ nd1d2-d1d1d2-1++ u m1++u n1+). This bound is stronger than that of Fox, Pach, Sheffer, Suk and Zahl when the first term dominates and u grows with m,n. Another consequence is that we can find a large complete bipartite subgraph in a semi-algebraic graph when the number of edges is large. Similar results hold for semi-algebraic hypergraphs.