论文信息 - The geometry of Euclidean convolution inequalities and entropy

The geometry of Euclidean convolution inequalities and entropy

The goal of this paper is to show that some convolution type inequalities from Harmonic Analysis and Information Theory, such as Young's convolution inequality (with sharp constant), Nelson's hypercontractivity of the Hermite semi-group or Shannon's inequality, can be reduced to a simple geometric study of frames of ℝ 2 . We shall derive directly entropic inequalities, which were recently proved to be dual to the Brascamp-Lieb convolution type inequalities.

Michel Ledoux | Dario Cordero-Erausquin

[1] Neal Bez,et al. Closure Properties of Solutions to Heat Inequalities , 2008 .

[2] E. Lieb,et al. A sharp analog of Young’s inequality on SN and related entropy inequalities , 2004, math/0408030.

[3] E. Carlen. Superadditivity of Fisher's information and logarithmic Sobolev inequalities , 1991 .

[4] F. Barthe,et al. Entropy of spherical marginals and related inequalities , 2006 .

[5] T. Tao,et al. The Brascamp–Lieb Inequalities: Finiteness, Structure and Extremals , 2005, math/0505065.

[6] E. Carlen,et al. Subadditivity of The Entropy and its Relation to Brascamp–Lieb Type Inequalities , 2007, 0710.0870.

[7] F. Barthe. Optimal young's inequality and its converse: a simple proof , 1997, math/9704210.

[8] L. Gross. LOGARITHMIC SOBOLEV INEQUALITIES. , 1975 .

[9] Amir Dembo,et al. Information theoretic inequalities , 1991, IEEE Trans. Inf. Theory.

[10] M. Ledoux,et al. Correlation and Brascamp–Lieb Inequalities for Markov Semigroups , 2009, 0907.2858.

[11] K. Ball. Chapter 4 – Convex Geometry and Functional Analysis , 2001 .

[12] W. Beckner. Inequalities in Fourier analysis , 1975 .

[13] E. Lieb,et al. Best Constants in Young's Inequality, Its Converse, and Its Generalization to More than Three Functions , 1976 .