A length comparison theorem for geodesic currents
Abstract
We work with the space C(S) of geodesic currents on a closed surface S of negative Euler characteristic. By prior work of the author with Sebastian Hensel, each filling geodesic current μ has a unique length-minimizing metric X in Teichm\"uller space. In this paper, we show that, on so-called thick components of X, the geometries of μ and X are comparable, up to a scalar depending only on μ and the topology of S. We also characterize thick components of the projection using only the length function of μ.
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