Closed Geodesics in Homology Classes for Convex Co-Compact Hyperbolic Manifolds |
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| Authors: | Jeffrey McGowan Peter Perry |
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| Affiliation: | (1) Department of Mathematics, Central Connecticut State University, New Britain, CT, 06050, U.S.A.;(2) Present address: Department of Mathematics, University of Kentucky, Lexington, KY, 40506–0027, U.S.A.;(3) Department of Mathematics, University of Kentucky, Lexington, KY, 40506–0027, U.S.A. |
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| Abstract: | Let  be a convex co-compact, torsion-free, discrete group of isometries of real hyperbolic space Hn+1. We compute the asymptotics of the counting function for closed geodesics in homology classes for the quotient manifold X = Hn+1, under the assumption that H1(X, Z) is infinite. Our results imply asymptotic equipartition of geodesics in distinct homology classes. |
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| Keywords: | closed geodesics hyperbolic manifolds Selberg trace formula |
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