Litcius/Paper detail

Unifying the Brascamp-Lieb Inequality and the Entropy Power Inequality

Venkat Anantharam, Varun Jog, Chandra Nair

2022IEEE Transactions on Information Theory20 citationsDOI

Abstract

The entropy power inequality (EPI) and the Brascamp-Lieb inequality (BLI) are fundamental inequalities concerning the differential entropies of linear transformations of random vectors. The EPI provides lower bounds for the differential entropy of linear transformations of random vectors with independent components. The BLI, on the other hand, provides upper bounds on the differential entropy of a random vector in terms of the differential entropies of some of its linear transformations. In this paper, we define a family of entropy functionals, which we show are subadditive. We then establish that Gaussians are extremal for these functionals by adapting a proof technique from Geng and Nair (2014). As a consequence, we obtain a new entropy inequality that generalizes both the BLI and EPI. By considering a variety of independence relations among the components of the random vectors appearing in these functionals, we also obtain families of inequalities that lie between the EPI and the BLI.

Topics & Concepts

Entropy power inequalityMathematicsDifferential entropySubadditivityEntropy (arrow of time)Pure mathematicsMultivariate random variableRandom variableGeneralized relative entropyQuantum relative entropyRényi entropyApplied mathematicsDiscrete mathematicsJoint quantum entropyPrinciple of maximum entropyEntropy rateStatisticsQuantumQuantum discordPhysicsQuantum entanglementQuantum mechanicsPoint processes and geometric inequalitiesMathematical Inequalities and ApplicationsDiffusion and Search Dynamics