Drawings of complete graphs in the projective plane

Abstract

Hill's Conjecture states that the crossing number cr(Kn) of the complete graph Kn in the plane (equivalently, the sphere) is 14n2n-12n-22n-32=n4/64 + O(n3). Moon proved that the expected number of crossings in a spherical drawing in which the points are randomly distributed and joined by geodesics is precisely n4/64+O(n3), thus matching asymptotically the conjectured value of cr(Kn). Let crP(G) denote the crossing number of a graph G in the projective plane. Recently, Elkies proved that the expected number of crossings in a naturally defined random projective plane drawing of Kn is (n4/8π2)+O(n3). In analogy with the relation of Moon's result to Hill's conjecture, Elkies asked if n∞ crP(Kn)/n4=1/8π2. We construct drawings of Kn in the projective plane that disprove this.