Lifting curves simply
Abstract
We provide linear lower bounds for f(L), the smallest integer so that every curve on a fixed hyperbolic surface (S,) of length at most L lifts to a simple curve on a cover of degree at most f(L). This bound is independent of hyperbolic structure , and improves on a recent bound of Gupta-Kapovich. When (S,) is without punctures, using work of Patel we conclude asymptotically linear growth of f. When (S,) has a puncture, we obtain exponential lower bounds for f.
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