Smooth discrepancy and Littlewood's conjecture
Abstract
Given α ∈ [0,1]d, we estimate the smooth discrepancy of the Kronecker sequence (n α \,mod\, 1)n≥ 1. We find that it can be smaller than the classical discrepancy of any sequence when d 2, and can even be bounded in the case d=1. To achieve this, we establish a novel deterministic analogue of Beck's local-to-global principle (Ann. of Math. 1994), which relates the discrepancy of a Kronecker sequence to multiplicative diophantine approximation. This opens up a new avenue of attack for Littlewood's conjecture.
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