Filling systems on surfaces

Abstract

Let Fg be a closed orientable surface of genus g. A set = \ γ1, …, γs\ of pairwise non-homotopic simple closed curves on Fg is called a filling system or simply a filling of Fg, if Fg is a union of b topological discs for some b≥ 1. A filling system is called minimal, if b=1. The size of a filling is defined as the number of its elements. We prove that the maximum size of a filling of Fg with b complementary discs is 2g+b-1. Next, we show that for g≥ 2, b≥ 1 with (g,b)≠ (2,1) (resp. (g,b)=(2,1)) and for each 2≤ s≤ 2g+b-1 (resp. 3≤ s≤ 2g+b-1), there exists a filling of Fg of size s with b complementary discs. Furthermore, we study geometric intersection number of curves in a minimal filling. For g≥ 2, we show that for a minimal filling of size s, the geometric intersection numbers satisfy i(γi, γj)| i≠ j≤ 2g-s+1, and for each such s there exists a minimal filling = γ1, …, γs such that i(γi, γj) | i≠ j = 2g-s+1.