A dichotomy phenomenon for Bad minus normed Dirichlet

Abstract

Given a norm on R2, the set of -Dirichlet improvable numbers DI was defined and studied in the papers of Andersen-Duke (Acta Arith. 2021) and Kleinbock-Rao (Internat. Math. Res. Notices 2022). When is the supremum norm, DI = BA Q, where BA is the set of badly approximable numbers. Each of the sets DI, like BA, is of measure zero and satisfies the winning property of Schmidt. Hence for every norm , BA DI is winning and thus has full Hausdorff dimension. In the present article we prove the following dichotomy phenomenon: either BA ⊂ DI or else BA DI has full Hausdorff dimension. We give several examples for each of the two cases. The dichotomy is based on whether the critical locus of intersects a precompact gt-orbit, where \gt\ is the one-parameter diagonal subgroup of SL2(R) acting on the space X of unimodular lattices in R2. Thus the aforementioned dichotomy follows from the following dynamical statement: for a lattice ∈ X, either gR is unbounded (and then any precompact gR>0-orbit must eventually avoid a neighborhood of ), or not, in which case the set of lattices in X whose gR>0-trajectories are precompact and contain in their closure has full Hausdorff dimension.