English

On the Discrepancy Function in Arbitary Dimension, Close to L ^{1}

Number Theory 2007-12-03 v2

Abstract

Let AN\mathcal A_N to be NN points in the unit cube in dimension d d, and consider the Discrepency function D_N(\vec x) \coloneqq \sharp \mathcal A_N \cap [\vec 0,\vec x)-N \abs{[\vec 0,\vec x)} Here, x=(x1,...c,xd) \vec x= (x_1 ,...c, x_d) and [0,x)=t=1d[0,xt)[ 0,\vec x)=\prod_{t=1} ^{d} [0,x_t). We show that necessarily \norm D_N. L ^{1} (\log L) ^{(d-2)/2}. \gtrsim (\log N) ^{d/2} . In dimension d=2d=2, the `logL \log L' term has power zero, which corresponds to a Theorem due to \cite{MR637361}.

Cite

@article{arxiv.math/0609817,
  title  = {On the Discrepancy Function in Arbitary Dimension, Close to L ^{1}},
  author = {Michael T Lacey},
  journal= {arXiv preprint arXiv:math/0609817},
  year   = {2007}
}

Comments

17 pages. To appear in Analysis Mathematica. Many changes, and an additional section on Hardy space and the Discrepancy function