An L1 estimate for half-space discrepancy
Abstract
For every unit vector σ∈d-1 and every r0, let % % displaymath Pσ,r=[-1,1]d\t∈d:t·σ r\ displaymath % % denote the intersection of the cube [-1,1]d with a half-space containing the origin 0∈d. We prove that if N is the d-th power of an odd integer, then there exists a distribution of N points in [-1,1]d such that % % displaymath r0 ∫_d-1( Pσ,r)-N2-d Pσ,r\,σ cd( N)d, displaymath % % generalizing an earlier result of Beck and the first author.
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