A shrinking target problem in homogeneous spaces of semisimple algebraic groups

Abstract

In this paper, we study a shrinking target problem with target at infinity in a homogeneous space of a semisimple algebraic group from the representation-theoretic point of view. Let : GGL(V) be an irreducible Q-rational representation of a connected semisimple Q-algebraic group G on a complex vector space V, \at\t∈ R a one-parameter subgroup in a Q-split torus in G and : R+ R+ a positive function on R+. We define a subset S() of -Diophantine elements in G( R) in terms of the representation and \at\t∈ R, and prove formulas for the Hausdorff dimension of the complement of S(). We also discuss the connections of our results to Diophantine approximation on flag varieties and rational approximation to linear subspaces in Grassmann varieties.

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