Shrinking targets problems for flows on homogeneous spaces
Abstract
We study shrinking targets problems for discrete time flows on a homogenous space G with G a semisimple group and an irreducible lattice. Our results apply to both diagonalizable and unipotent flows, and apply to very general families of shrinking targets. As a special case, we establish logarithm laws for cusp excursions of unipotent flows answering a question of Athreya and Margulis.
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