Systems of arcs on a torus with two punctures

Abstract

For a compact surface S with a finite set of marked points P , we define a 1-system to be a collection of arcs which are pairwise non-homotopic and intersect pairwise at most once. We prove that, up to equivalence, there are exactly 23 maximal 1-systems on (S, P) when S is a torus and |P| = 2 . Along the way, we generalize some of the results of a previous paper to the context of surfaces with boundary. In particular, we prove that the maximal cardinality of a 1-system on (S, P) is 2 || (|| + 1) - v2 , where is the Euler characteristic of (S, P) and v is the number of marked points of P in the boundary of S .