On the L2-discrepancy of Latin hypercubes

Abstract

We investigate L2-discrepancies of what we call weak Latin hypercubes. In this case it turns out that there is a precise equivalence between the extreme and periodic L2-discrepancy which follows from a much broader result about generalized energies for weighted point sets. Motivated by this we study the asymptotics of the optimal L2-discrepancy of weak Latin hypercubes. We determine asymptotically tight bounds for d ≥ 3 and even the precise (dimension dependent) constant in front of the dominating term for d ≥ 4.

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