Constructing large k-systems on Surfaces

Abstract

Let Sg denote the genus g closed orientable surface. For k∈ N, a k-system is a collection of pairwise non-homotopic simple closed curves such that no two intersect more than k times. Juvan-Malnic-Mohar Ju-Mal-Mo showed that there exists a k-system on Sg whose size is on the order of gk/4. For each k≥ 2, We construct a k-system on Sg with on the order of g (k+1)/2 +1 elements. The k-systems we construct behave well with respect to subsurface inclusion, analogously to how a pants decomposition contains pants decompositions of lower complexity subsurfaces.