Best versus uniform Diophantine approximatio

Abstract

Let 0<m<n be integers, and let Kw denote the completion of a number field K at a non-trivial place w. For each non-zero u∈ Kwn, let ωm-1(u) denote the exponent of best approximation to u by vector subspaces of Kwn of dimension m defined over K, and let ωm-1(u) denote the corresponding exponent of uniform approximation. Finally, let Sm,n denote the set of all pairs (ωm-1(u),ωm-1(u)) where u runs through all points of Kwn with linearly independent coordinates over K. In this paper we use parametric geometry of numbers to study this spectrum Sm,n, noting at first that it is independent of the choice of K and w. We may thus assume that K=Q and Kw=R. In this context, Schmidt and Summerer proposed conjectural descriptions for S1,n and Sn-1,n which were confirmed by Marnat and Moshchevitin for each n 2. We give an alternative proof of their result based on the PhD thesis of the first author, highlighting the duality between the two spectra. In his thesis, the first author generalized the conjecture to any pair (m,n) and proved it to be true also for S2,4. We present this as well, but show that this natural conjecture fails for S3,5. Moreover, the part of S3,5 that we succeed to compute here suggests a complicated boundary for that set, possibly not semialgebraic. We also give a qualitative description of Sm,n for a general pair (m,n).

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