Birkhoff generic points on curves in horospheres

Abstract

Let \at: t ∈ R\< SLd(R) be a diagonalizable subgroup whose expanding horospherical subgroup U < SLd(R) is abelian. By the Birkhoff ergodic theorem, for any x ∈ SLd(R)/SLd(Z) and for almost every point u ∈ U the point ux is Birkhoff generic for at when t ∞. We prove that the same is true when U is replaced by any non-degenerate analytic curve in U. This Birkhoff genericity result has various applications in Diophantine approximation. For instance, we obtain density estimates for Dirichlet improvability along typical points on a curve in Euclidean space. Other applications address approximations by algebraic numbers and best approximations (in the sense of Lagarias).