The Euclidean cone metrics coming from q–differentials on a closed surface of genus g ≥ 2 define an equivalence relation on homotopy classes of closed curves, where two classes are equivalent if they have the equal length in every such metric. We prove an analogue of the result of Randol for hyperbolic metrics (building on the work of Horowitz): for every integer q ≥ 1, the corresponding equivalence relation has arbitrarily large equivalence classes. In addition, we describe how these equivalence relations are related to each other.
Keywords: compact surfaces, flat metrics, hyperbolic metrics
Bankovic, Anja 1
@article{10_2140_agt_2014_14_3107,
author = {Bankovic, Anja},
title = {Horowitz{\textendash}Randol pairs of curves in q{\textendash}differential metrics},
journal = {Algebraic and Geometric Topology},
pages = {3107--3139},
year = {2014},
volume = {14},
number = {5},
doi = {10.2140/agt.2014.14.3107},
url = {http://geodesic.mathdoc.fr/articles/10.2140/agt.2014.14.3107/}
}
TY - JOUR AU - Bankovic, Anja TI - Horowitz–Randol pairs of curves in q–differential metrics JO - Algebraic and Geometric Topology PY - 2014 SP - 3107 EP - 3139 VL - 14 IS - 5 UR - http://geodesic.mathdoc.fr/articles/10.2140/agt.2014.14.3107/ DO - 10.2140/agt.2014.14.3107 ID - 10_2140_agt_2014_14_3107 ER -
Bankovic, Anja. Horowitz–Randol pairs of curves in q–differential metrics. Algebraic and Geometric Topology, Tome 14 (2014) no. 5, pp. 3107-3139. doi: 10.2140/agt.2014.14.3107
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