English

Counting for some convergent groups

Dynamical Systems 2017-07-27 v1

Abstract

We present examples of geometrically finite manifolds with pinched negative curvature, whose geodesic flow has infinite non-ergodic Bowen-Margulis measure and whose Poincar\'e series converges at the critical exponent δΓ\delta_\Gamma. We obtain an explicit asymptotic for their orbital growth function. Namely, for any α]1,2[\alpha \in ]1, 2[ and any slowly varying function L:R(0,+)L : \mathbb R\to (0, +\infty), we construct NN-dimensional Hadamard manifolds (X,g)(X, g) of negative and pinched curvature, whose group of oriented isometries admits convergent geometrically finite subgroups Γ\Gamma such that, as R+R\to +\infty, NΓ(R):=#{γΓ  ;  d(o,γo)R}CΓL(R)Rα eδΓR, N_\Gamma(R):= \#\left\{\gamma\in \Gamma \; ; \; d(o, \gamma \cdot o)\leq R\right\} \sim C_\Gamma \frac{L(R)}{R^\alpha} \ e^{\delta_\Gamma R}, for some constant CΓ>0C_\Gamma >0.

Keywords

Cite

@article{arxiv.1707.08264,
  title  = {Counting for some convergent groups},
  author = {Marc Peigné and Samuel Tapie and Pierre Vidotto},
  journal= {arXiv preprint arXiv:1707.08264},
  year   = {2017}
}

Comments

20 pages

R2 v1 2026-06-22T20:57:34.818Z