Packing curves on surfaces with few intersections

Abstract

Przytycki has shown that the size Nk(S) of a maximal collection of simple closed curves that pairwise intersect at most k times on a topological surface S grows at most as a polynomial in |(S)| of degree k2+k+1. In this paper, we narrow Przytycki's bounds by showing that Nk(S) =O ( ||3k ( || )2 ) , In particular, the size of a maximal 1-system grows sub-cubically in |(S)|. The proof uses a circle packing argument of Aougab-Souto and a bound for the number of curves of length at most L on a hyperbolic surface. When the genus g is fixed and the number of punctures n grows, we can improve our estimates using a different argument to give Nk(S) ≤ O(n2k+2) . Using similar techniques, we also obtain the sharp estimate N2(S)=(n3) when k=2 and g is fixed.