Dimension bound for badly approximable grids
Abstract
We show that for almost any vector v in Rn, for any ε>0 there exists δ>0 such that the dimension of the set of vectors w satisfying k∞ k1/n<kv-w> ε (where <·> denotes the distance from the nearest integer), is bounded above by n-δ. This result is obtained as a corollary of a discussion in homogeneous dynamics and the main tool in the proof is a relative version of the principle of uniqueness of measures with maximal entropy.
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