A construction of minimal coherent filling pairs

Abstract

Let Sg denote the genus g closed orientable surface. A coherent filling pair of simple closed curves, (α,β) in Sg, is a filling pair that has its geometric intersection number equal to the absolute value of its algebraic intersection number. A minimally intersecting filling pair, (α,β) in Sg, is one whose intersection number is the minimal among all filling pairs of Sg. In this paper, we give a simple geometric procedure for constructing minimal intersecting coherent filling pairs on Sg, \ g ≥ 3, from the starting point of a coherent filling pair of curves on a torus. Coherent filling pairs have a natural correspondence to square-tiled surfaces, or origamis, and we discuss the origami obtained from the construction.