On generalized Csiszár-Kullback inequalities

Anton Arnold; Peter Markowich; Giuseppe Toscani; Andreas Unterreiter

doi:10.22028/D291-26168

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On generalized Csiszár-Kullback inequalities

Anton Arnold, Peter Markowich, Giuseppe Toscani and Andreas Unterreiter

Universität des Saarlandes

01/01/2000

DOI: https://doi.org/10.22028/D291-26168

Abstract

The classical Csiszar-Kullback inequality bounds the L^{1}-distance of two probability densities in term of their relative (convex) entropies. Here we generalize such inequalities to not necessarily normalized and possibly non-positive L^{1} functions. Also, our generalized Csiszar-Kullback inequalities are in many important cases sharper than the classical ones (in terms of the functional dependence of the L^{1} bound on the relative entropy). Moreover our construction of these bounds is rather elementary.

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Title: On generalized Csiszár-Kullback inequalities
Creators - without role: Anton Arnold - Saarland University
Peter Markowich - University of Vienna
Giuseppe Toscani - University of Pavia
Andreas Unterreiter - University of Kaiserslautern
Publisher: Universität des Saarlandes
Identifiers: 9945521308331
Academic Unit: King Abdullah University of Science & Technology
Language: English
Resource Type: Other