Distribution of lattice orbits on homogeneous varieties
arXiv:math/0407345
Abstract
Given a lattice Îin a locally compact group G and a closed subgroup H of G, one has a natural action of Îon the homogeneous space V=H\G. For an increasing family of finite subsets {Î_T: T>0}, a dense orbit vÎ, v\in V, and compactly supported function Ïon V, we consider the sums S_{Ï,v}(T)=\sum_{γ\in Î_T} Ï(v γ). Understanding the asymptotic behavior of S_{Ï,v}(T) is a delicate problem which has only been considered for certain very special choices of H, G and {Î_T}. We develop a general abstract approach to the problem, and apply it to the case when G is a Lie group and either H or G is semisimple. When G is a group of matrices equipped with a norm, we have S_{Ï,v}(T) \sim \int_{G_T} Ï(vg) dg, where G_T={g\in G:||g||<T} and Î_T = G_T \cap Î. We also show that the asymptotics of S_{Ï,v}(T) is governed by \int_V Ïdν, where νis an explicit limiting density depending on the choice of v and the norm.