Equidistribution of polynomially bounded o-minimal curves in homogeneous spaces
Abstract
We extend Ratner's theorem on equidistribution of individual orbits of unipotent flows on finite volume homogeneous spaces of Lie groups to trajectories of non-contracting curves definable in polynomially bounded o-minimal structures. To be precise, let :[0,∞) SL(n, R) be a continuous map whose coordinate functions are definable in a polynomially bounded o-minimal structure; for example, rational functions. Suppose that is non-contracting; that is, for any linearly independent vectors v1,…,vk in Rn, (t).(v1·s vk)0 as t∞. Then, there exists a unique smallest subgroup H of SL(n, R) generated by unipotent one-parameter subgroups such that (t)H g0H in SL(n, R)/H as t∞ for some g0∈ SL(n, R). Let G be a closed subgroup of SL(n, R) and be a lattice in G. Suppose that ([0,∞))⊂ G. Then H⊂ G, and for any x∈ G/, the trajectory \(t)x:t∈ [0,T]\ gets equidistributed with respect to the measure g0μLx as T∞, where L is a closed subgroup of G such that Hx=Lx and Lx admits a unique L-invariant probability measure, denoted by μLx. A crucial new ingredient in this work is proving that for any finite-dimensional representation V of SL(n, R), there exist T0>0, C>0, and α>0 such that for any v∈ G, the map t \|(t)v\| is (C,α)-good on [T0,∞).
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.