Length of Filling Pairs on Punctured Surface
Abstract
A pair (α, β) of simple closed curves on a surface Sg,n of genus g and with n punctures is called a filling pair if the complement of the union of the curves is a disjoint union of topological disks and once punctured disks. In this article, we study the length of filling pairs on once-punctured hyperbolic surfaces. In particular, we find a lower bound of the length of filling pairs which depends only on the topology of the surface.
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