Curves on the torus intersecting at most k times

Abstract

We show that any set of distinct homotopy classes of simple closed curves on the torus that pairwise intersect at most k times has size k + O(k k). Prior to this work, a lemma of Agol, together with the state of the art bounds for the size of prime gaps, implied the error term O(k21/40), and in fact the assumption of the Riemann hypothesis improved this error term to the one we obtain O(k k). By contrast, our methods are elementary, combinatorial, and geometric.