Building hyperbolic metrics suited to closed curves and applications to lifting simply

Abstract

Let γ be an essential closed curve with at most k self-intersections on a surface S with negative Euler characteristic. In this paper, we construct a hyperbolic metric for which γ has length at most M · k, where M is a constant depending only on the topology of S. Moreover, the injectivity radius of is at least 1/(2k). This yields linear upper bounds in terms of self-intersection number on the minimum degree of a cover to which γ lifts as a simple closed curve (i.e. lifts simply). We also show that if γ is a closed curve with length at most L on a cusped hyperbolic surface S, then there exists a cover of S of degree at most N · L · eL/2 to which γ lifts simply, for N depending only on the topology of S.