Concentration Inequalities on the Multislice and for Sampling Without Replacement

We present concentration inequalities on the multislice which are based on (modified) log-Sobolev inequalities. This includes bounds for convex functions and multilinear polynomials. As an application, we show concentration results for the triangle count in the G(n, M) Erdos-Renyi model resembling known bounds in the G(n, p) case. Moreover, we give a proof of Talagrand's convex distance inequality for the multislice. Interpreting the multislice in a sampling without replacement context, we furthermore present concentration results for n out of N sampling without replacement. Based on a bounded difference inequality involving the finite-sampling correction factor 1 - (n/ N), we present an easy proof of Serfling's inequality with a slightly worse factor in the exponent, as well as a sub-Gaussian right tail for theKolmogorov distance between the empirical measure and the true distribution of the sample.

Stichworte

Concentration of measure; Convex distance inequality; Erdos-Renyi; graphs; Multislice; Sampling without replacement

Erscheinungsjahr

2022

Zeitschriftentitel

Journal of Theoretical Probability

Band

Seite(n)

2712–2737

Urheberrecht / Lizenzen

Creative Commons Namensnennung 4.0 International Public License (CC-BY 4.0)

ISSN

0894-9840

eISSN

1572-9230

Finanzierungs-Informationen

Open-Access-Publikationskosten wurden durch die Universität Bielefeld im Rahmen des DEAL-Vertrags gefördert.

Page URI

https://pub.uni-bielefeld.de/record/2958892

Zitieren

Sambale H, Sinulis A. Concentration Inequalities on the Multislice and for Sampling Without Replacement. Journal of Theoretical Probability . 2022;35:2712–2737.

Sambale, H., & Sinulis, A. (2022). Concentration Inequalities on the Multislice and for Sampling Without Replacement. Journal of Theoretical Probability , 35, 2712–2737. https://doi.org/10.1007/s10959-021-01139-9

Sambale, Holger, and Sinulis, Arthur. 2022. “Concentration Inequalities on the Multislice and for Sampling Without Replacement”. Journal of Theoretical Probability 35: 2712–2737.

Sambale, H., and Sinulis, A. (2022). Concentration Inequalities on the Multislice and for Sampling Without Replacement. Journal of Theoretical Probability 35, 2712–2737.

Sambale, H., & Sinulis, A., 2022. Concentration Inequalities on the Multislice and for Sampling Without Replacement. Journal of Theoretical Probability , 35, p 2712–2737.

H. Sambale and A. Sinulis, “Concentration Inequalities on the Multislice and for Sampling Without Replacement”, Journal of Theoretical Probability , vol. 35, 2022, pp. 2712–2737.

Sambale, H., Sinulis, A.: Concentration Inequalities on the Multislice and for Sampling Without Replacement. Journal of Theoretical Probability . 35, 2712–2737 (2022).

Sambale, Holger, and Sinulis, Arthur. “Concentration Inequalities on the Multislice and for Sampling Without Replacement”. Journal of Theoretical Probability 35 (2022): 2712–2737.

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