Simultaneous Diophantine approximation to points on the Veronese curve
Abstract
We compute the Hausdorff dimension of the set of simultaneously q-λ-well approximable points on the Veronese curve in Rn for λ between 1n and 22n-1. For n=3, the same result is given for a wider range of λ between 13 and 12. We also provide a nontrivial upper bound for this Hausdorff dimension in the case λ 2n. In the course of the proof we establish that the number of cubic polynomials of height at most H and non-zero discriminant at most D is bounded from above by c(ε) H2/3 + ε D5/6.
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