Author:
Marklof Jens,Vinogradov Ilya
Abstract
Abstract
It is well known that the orbit of a lattice in hyperbolic n-space is uniformly distributed when projected radially onto the unit sphere. In the present work, we consider the fine-scale statistics of the projected lattice points, and express the limit distributions in terms of random hyperbolic lattices. This provides in particular a new perspective on recent results by Boca, Popa, and Zaharescu on 2-point correlations for the modular group, and by Kelmer and Kontorovich for general lattices in dimension n = 2.
Funder
European Research Council
Subject
Applied Mathematics,General Mathematics
Reference32 articles.
1. A lattice point problem in hyperbolic space;Michigan Math. J.,1983
2. The distribution of free path lengths in the periodic Lorentz gas and related lattice point problems;Ann. of Math. (2),2010
3. Distribution of angles between geodesic rays associated with hyperbolic lattice points;Q. J. Math.,2007
4. Mixing, counting, and equidistribution in Lie groups;Duke Math. J.,1993
5. On the statistics of the minimal solution of a linear Diophantine equation and uniform distribution of the real part of orbits in hyperbolic spaces;Spectral analysis in geometry and number theory,2009
Cited by
14 articles.
订阅此论文施引文献
订阅此论文施引文献,注册后可以免费订阅5篇论文的施引文献,订阅后可以查看论文全部施引文献