Improved expected L_2-discrepancy formulas on jittered sampling

11/15/2022

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We study the expected L_2-discrepancy under two classes of partitions, explicit and exact formulas are derived respectively. These results attain better expected L_2-discrepancy formulas than jittered sampling.

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Improved expected L_2-discrepancy formulas on jittered sampling

Expected L_2-discrepancy bound for a class of new stratified sampling models

Inadmissibility of the corrected Akaike information criterion

Star discrepancy for new stratified random sampling I: optimal expected star discrepancy

A note on the periodic L_2-discrepancy of Korobov's p-sets

A Review of Change of Variable Formulas for Generative Modeling

Discrepancy of stratified samples from partitions of the unit cube

Newcomb-Benford's law as a fast ersatz of discrepancy measures

Improved expected L_2-discrepancy formulas on jittered sampling

Related Research

Expected L_2-discrepancy bound for a class of new stratified sampling models

Inadmissibility of the corrected Akaike information criterion

Star discrepancy for new stratified random sampling I: optimal expected star discrepancy

A note on the periodic L_2-discrepancy of Korobov's p-sets

A Review of Change of Variable Formulas for Generative Modeling

Discrepancy of stratified samples from partitions of the unit cube

Newcomb-Benford's law as a fast ersatz of discrepancy measures