On divergent on average trajectories for higher rank actions

Abstract

For d 3 we first show that the Hausdorff dimension of the set of A-divergent on average points in the (d-1)-dimensional closed horosphere in the space of d-dimensional Euclidean lattices, where A is the group of positive diagonal matrices, is at most d-12. In particular, this upper bound is sharp for d=3. We apply this to compute the Hausdorff dimension of the set of exceptions to the inhomogeneous uniform version of Littlewood conjecture. We say that a pair (1,2)∈R2 satisfies the inhomogeneous Littlewood conjecture if q∞q\|q1-θ1\|Z\|q2-θ2\|Z=0 for all (θ1,θ2)∈R2, where \|·\|Z denotes the distance to the nearest integer. We prove that the Hausdorff dimension of the set of pairs (1,2)∈R2 not satisfying the inhomogeneous Littlewood conjecture is 1, which is equal to the Hausdorff dimension of the conjectural set of exceptions.