Gregory Margulis, Amir Mohammadi, Hee Oh
Published 2014-04-23, updated 2015-03-08Version 3
For a rank one Lie group G and a Zariski dense and geometrically finite subgroup $\Gamma$ of G, we establish equidistribution of holonomy classes about closed geodesics for the associated locally symmetric space. Our result is given in a quantitative form for real hyperbolic geometrically finite manifolds whose critical exponents are big enough. In the case when G=PSL(2, C), our results can be interpreted as the equidistribution of eigenvalues of $\Gamma$ in the complex plane. When $\Gamma$ is a lattice, this result was proved by Sarnak and Wakayama in 1999.
Comments: 27 pages, Minor corrections in the main term of the effective versions of Theorem 1.2, 1.3 and 5.1 are made from the printed version (GAFA,Vol 24 (2014) 1608-1636)
Orbits of discrete subgroups on a symmetric space and the Furstenberg boundary
Amenability, Critical Exponents of Subgroups and Growth of Closed Geodesics
Logarithmic improvements in the Weyl law and exponential bounds on the number of closed geodesics are predominant
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