Dirichlet improvability in Lp-norms

Abstract

For a norm F on R2, we consider the set of F-Dirichlet improvable numbers DIF. In the most important case of F being an Lp-norm with p=∞, which is a supremum norm, it is well-known that DIF = BA Q, where BA is a set of badly approximable numbers. It is also known that BA and each DIF are of measure zero and of full Hausdorff dimension. Using classification of critical lattices for unit balls in Lp, we provide a complete and effective characterization of DIp:=DIF[p] in terms of the occurrence of patterns in regular continued fraction expansions, where F[p] is an Lp-norm with p∈[1,∞). This yields several corollaries. In particular, we resolve two open questions by Kleinbock and Rao by showing that the set DIp BA is of full Hausdorff dimension, as well as proving some results about the size of the difference DIp1 DIp2. To be precise, we show that the set difference of Dirichlet improvable numbers in Euclidean norm (p=2) minus Dirichlet improvable numbers in taxicab norm (p=1) and vice versa, that is DI2 DI1 and DI1 DI2, are of full Hausdorff dimension. We also find all values of p, for which the set DIpcBA has full Hausdorff dimension. Finally, our characterization result implies that the number e satisfies e∈ DIp if and only if p∈(1,2)(p0,∞) for some special constant p0≈2.57.