An inequality for relative entropy and logarithmic Sobolev inequalities in Euclidean spaces

Abstract

Let q(x) and p(x) denote density functions on the n-dimensional Euclidean space, and let pi(·|y1,..., yi-1,yi+1,..., yn) and Qi(·|x1,..., xi-1,xi+1,..., xn) denote their local specifications. For a class of density functions q we prove an inequality between the relative entropy D(p||q) and a weighted sum of the conditional relative entropies D(pi(·|Y1,..., Yi-1,Yi+1,..., Yn) ||Qi(·|Y1,..., Yi-1,Yi+1,..., Yn)) that holds for any p. The weights are proportional to the logarithmic Sobolev constants of the local specifications of q. Thereby we derive a logarithmic Sobolev inequality for a weighted Gibbs sampler governed by the local specifications of q. Moreover, this inequality implies a classical logarithmic Sobolev inequality for q, as defined for Gaussian distribution by L. Gross. This strengthens a result by F. Otto and M. Reznikoff. The proof is based on ideas developed by F. Otto and C. Villani in their paper on the connection between Talagrand's transportation-cost inequality and logarithmic Sobolev inequality.