An L^1 estimate for half-space discrepancy
For every unit vector $\sigma\in\Sigma_{d-1}$ and every $r\ge0$, let % % \begin{displaymath} P_{\sigma,r}=[-1,1]^d\cap\{t\in\Rr^d:t\cdot\sigma\le r\} \end{displaymath} % % denote the intersection of the cube $[-1,1]^d$ with a half-space containing the origin $0\in\Rr^d$. We prove that if $N$ is the...
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| Zusammenfassung: | For every unit vector $\sigma\in\Sigma_{d-1}$ and every $r\ge0$, let % %
\begin{displaymath} P_{\sigma,r}=[-1,1]^d\cap\{t\in\Rr^d:t\cdot\sigma\le r\}
\end{displaymath} % % denote the intersection of the cube $[-1,1]^d$ with a
half-space containing the origin $0\in\Rr^d$. We prove that if $N$ is the
$d$-th power of an odd integer, then there exists a distribution $\PPP$ of $N$
points in $[-1,1]^d$ such that % % \begin{displaymath} \sup_{r\ge0}
\int_{\Sigma_{d-1}}\vert\card(\PPP\cap P_{\sigma,r})-N2^{-d} \vert
P_{\sigma,r}\vert\vert\,\dd\sigma \le c_d(\log N)^d, \end{displaymath} % %
generalizing an earlier result of Beck and the first author. |
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| DOI: | 10.48550/arxiv.1005.1463 |