Genericity on submanifolds and application to Universal hitting time statistics

Abstract

We investigate Birkhoff genericity on submanifolds of homogeneous space X=SLd() (d)k/ SLd() (d)k, where d≥ 2 and k≥ 1 are fixed integers. The submanifolds we consider are parameterized by unstable horospherical subgroup U of a diagonal flow at in SLd(). As long as the intersection of the submanifold with any affine rational subspace has Lebesgue measure zero, we show that the trajectory of at along Lebesgue almost every point on the submanifold gets equidistributed on X. This generalizes the previous work of Fraczek, Shi and Ulcigrai in ShiUlcigraiGenericityoncurves2018. Following the scheme developed by Dettmann, Marklof and Str\"ombergsson in MarklofUniversalhittingtime2017, we then deduce an application to universal hitting time statistics for integrable flows.