Orthonormal representations of H-free graphs

Abstract

Let x1, …, xn ∈ Rd be unit vectors such that among any three there is an orthogonal pair. How large can n be as a function of d, and how large can the length of x1 + … + xn be? The answers to these two celebrated questions, asked by Erdos and Lov\'asz, are closely related to orthonormal representations of triangle-free graphs, in particular to their Lov\'asz -function and minimum semidefinite rank. In this paper, we study these parameters for general H-free graphs. In particular, we show that for certain bipartite graphs H, there is a connection between the Tur\'an number of H and the maximum of ( G ) over all H-free graphs G.