Characterizing covers via simple closed curves

Abstract

Given two finite covers p: X S and q: Y S of a connected, oriented, closed surface S of genus at least 2, we attempt to characterize the equivalence of p and q in terms of which curves lift to simple curves. Using Teichm\"uller theory and the complex of curves, we show that two regular covers p and q are equivalent if for any closed curve γ ⊂ S, γ lifts to a simple closed curve on X if and only if it does to Y. When the covers are abelian, we also give a characterization of equivalence in terms of which powers of simple closed curves lift to closed curves.