Abstract
This article explores the connection between a generalized Riesz electric energy and norms on the set of probability measures defined in terms of duality. We derive functional inequalities linking these two notions, recovering and generalizing existing Coulomb transport inequalities. We then use them to prove concentration of measure around the equilibrium and thermal equilibrium measures. Finally, we leverage these concentration inequalities to obtain Moser-Trudinger-type inequalities, which may also be interpreted as bounds on the Laplace transform of fluctuations.
Funding Statement
DPG acknowledges support by the German Research Foundation (DFG) via the research unit FOR 3013 “Vector- and tensor-valued surface PDEs” (grant no. NE2138/3-1).
Citation
David García-Zelada. David Padilla-Garza. "Generalized transport inequalities and concentration bounds for Riesz-type gases." Electron. J. Probab. 29 1 - 35, 2024. https://doi.org/10.1214/24-EJP1170
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