Exponential inequalities in probability spaces revisited

  • Ali Barki

    Université Paris Nanterre, UPL, CNRS, France
  • Sergey Bobkov

    University of Minnesota, Minneapolis, USA
  • Esther Bou Dagher

    Université Paris-Dauphine-PSL, France
  • Cyril Roberto

    Université Paris Nanterre, UPL, CNRS, France
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Abstract

We revisit several results on exponential integrability in probability spaces and derive some new ones. In particular, we give a quantitative form of recent results by Cianchi–Musil and Pick in the framework of Moser–Trudinger-type inequalities, and recover Ivanisvili–Russell’s inequality for the Gaussian measure. One key ingredient is the use of a dual argument, which is new in this context, that we also implement in the discrete setting of the Poisson measure on integers.

Cite this article

Ali Barki, Sergey Bobkov, Esther Bou Dagher, Cyril Roberto, Exponential inequalities in probability spaces revisited. Rev. Mat. Iberoam. (2026), published online first

DOI 10.4171/RMI/1635