Add to ORKGAs discovered by Brenier, mapping through a convex gradient gives the optimal transport in Rn. In the present article, this map is used in the setting of Gaussian-like measures to derive an inequality linking entropy with mass displacement by a straightforward argument. As a consequence, logarithmic Sobolev and transport inequalities are recovered. Finally, a result of Caffarelli on the Brenier map is used to obtain Gaussian correlation inequalities
International audience<p>A nontrivial linear mixture of independent random variables of fixed entrop...
Abstract. We develop the optimal transportation approach to modified log-Sobolev inequalities and to...
AbstractLet A⊂Rd, d⩾2, be a compact convex set and let μ=ϱ0dx be a probability measure on A equivale...
International audienceAs discovered by Brenier, mapping through a convex gradient gives the optimal ...
We show that transport inequalities, similar to the one derived by M. Talagrand (1996, Geom. Funct. ...
Any probability measure on d which satisfies the Gaussian or exponential isoperimetric inequality fu...
Any probability measure on d which satisfies the Gaussian or exponential isoperimetric inequality fu...
AbstractWe show that transport inequalities, similar to the one derived by M. Talagrand (1996, Geom....
We develop connections between Stein’s approximation method, logarithmic Sobolev and transport inequ...
52 pages. To appear in GAFAInternational audienceWe develop connections between Stein's approximatio...
This note consists of two parts. Firstly, we bound the deficit in the logarithmic Sobolev Inequality...
Abstract. Let A ⊂ Rd, d ≥ 2, be a compact convex set and let µ = %0 dx be a probability measure on A...
International audienceA framework for deriving Rényi entropy-power inequalities (EPIs) is presented ...
We introduce the notion of an interpolating path on the set of probability measures on finite graphs...
My research is focused on functional inequalities related to the concentration of measure phenomenon...
International audience<p>A nontrivial linear mixture of independent random variables of fixed entrop...
Abstract. We develop the optimal transportation approach to modified log-Sobolev inequalities and to...
AbstractLet A⊂Rd, d⩾2, be a compact convex set and let μ=ϱ0dx be a probability measure on A equivale...
International audienceAs discovered by Brenier, mapping through a convex gradient gives the optimal ...
We show that transport inequalities, similar to the one derived by M. Talagrand (1996, Geom. Funct. ...
Any probability measure on d which satisfies the Gaussian or exponential isoperimetric inequality fu...
Any probability measure on d which satisfies the Gaussian or exponential isoperimetric inequality fu...
AbstractWe show that transport inequalities, similar to the one derived by M. Talagrand (1996, Geom....
We develop connections between Stein’s approximation method, logarithmic Sobolev and transport inequ...
52 pages. To appear in GAFAInternational audienceWe develop connections between Stein's approximatio...
This note consists of two parts. Firstly, we bound the deficit in the logarithmic Sobolev Inequality...
Abstract. Let A ⊂ Rd, d ≥ 2, be a compact convex set and let µ = %0 dx be a probability measure on A...
International audienceA framework for deriving Rényi entropy-power inequalities (EPIs) is presented ...
We introduce the notion of an interpolating path on the set of probability measures on finite graphs...
My research is focused on functional inequalities related to the concentration of measure phenomenon...
International audience<p>A nontrivial linear mixture of independent random variables of fixed entrop...
Abstract. We develop the optimal transportation approach to modified log-Sobolev inequalities and to...
AbstractLet A⊂Rd, d⩾2, be a compact convex set and let μ=ϱ0dx be a probability measure on A equivale...