Showing papers by "Jean Dolbeault published in 2011"
TL;DR: Forward self-similar solutions of the parabolic–parabolic Keller–Segel system are studied and it is proved that, in some cases, such solutions globally exist even if their total mass is above Mc, which is forbidden in theParabolic–elliptic case.
Abstract: In two space dimensions, the parabolic–parabolic Keller–Segel system shares many properties with the parabolic–elliptic Keller–Segel system. In particular, solutions globally exist in both cases as long as their mass is less than a critical threshold M
c
. However, this threshold is not as clear in the parabolic–parabolic case as it is in the parabolic–elliptic case, in which solutions with mass above M
c
always blow up. Here we study forward self-similar solutions of the parabolic–parabolic Keller–Segel system and prove that, in some cases, such solutions globally exist even if their total mass is above M
c
, which is forbidden in the parabolic–elliptic case.
79 citations
TL;DR: In this article, the radial symmetry of extremals was analyzed for a class of interpolation inequalities known as Caffarelli-Kohn-Nirenberg inequalities, and for a weighted logarithmic Hardy inequalities which appear as limiting cases of the first ones.
Abstract: We analyze the radial symmetry of extremals for a class of interpolation inequalities known as Caffarelli–Kohn–Nirenberg inequalities, and for a class of weighted logarithmic Hardy inequalities which appear as limiting cases of the first ones. In both classes we show that there exists a continuous surface that splits the set of admissible parameters into a region where extremals are symmetric and a region where symmetry breaking occurs. In previous results, the symmetry breaking region was identified by showing the linear instability of the radial extremals. Here we prove that symmetry can be broken even within the set of parameters where radial extremals correspond to local minima for the variational problem associated with the inequality. For interpolation inequalities, such a symmetry breaking phenomenon is entirely new.
40 citations
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TL;DR: In this paper, the authors consider a family of Gagliardo-Nirenberg-Sobolev interpolation inequalities which interpolate between Sobolev's inequality and the logarithmic SNS inequality, with optimal constants.
Abstract: We consider a family of Gagliardo-Nirenberg-Sobolev interpolation inequalities which interpolate between Sobolev's inequality and the logarithmic Sobolev inequality, with optimal constants. The difference of the two terms in the interpolation inequalities (written with optimal constant) measures a distance to the manifold of the optimal functions. We give an explicit estimate of the remainder term and establish an improved inequality, with explicit norms and fully detailed constants. Our approach is based on nonlinear evolution equations and improved entropy - entropy production estimates along the associated flow. Optimizing a relative entropy functional with respect to a scaling parameter, or handling properly second moment estimates, turns out to be the central technical issue. This is a new method in the theory of nonlinear evolution equations, which can be interpreted as the best fit of the solution in the asymptotic regime among all asymptotic profiles.
38 citations
TL;DR: In this paper, the authors investigated how to relate Sobolev and Hardy-Littlewood-Sobolev inequalities using the flow of a fast diffusion equation in dimension $d\ge3.
Abstract: In the euclidean space, Sobolev and Hardy-Littlewood-Sobolev inequalities can be related by duality. In this paper, we investigate how to relate these inequalities using the flow of a fast diffusion equation in dimension $d\ge3$. The main consequence is an improvement of Sobolev's inequality when $d\ge5$, which involves the various terms of the dual Hardy-Littlewood-Sobolev inequality. In dimension $d=2$, Onofri's inequality plays the role of Sobolev's inequality and can also be related to its dual inequality, the logarithmic Hardy-Littlewood-Sobolev inequality, by a super-fast diffusion equation.
38 citations
TL;DR: In this article, a non-self-similar change of coordinates is proposed to improve matching asymptotics of the solutions of the fast diffusion equation for large times, compared to already known results, in the range for which Barenblatt solutions have a finite second moment.
Abstract: A non self-similar change of coordinates provides improved matching asymptotics of the solutions of the fast diffusion equation for large times, compared to already known results, in the range for which Barenblatt solutions have a finite second moment. The method is based on relative entropy estimates and a time-dependent change of variables which is determined by second moments, and not by the scaling corresponding to the self-similar Barenblatt solutions, as it is usually done.
30 citations
TL;DR: This letter is devoted to results on intermediate asymptotics for the heat equation, and establishes the equivalence of the exponential decay of the entropies with new, improved functional inequalities in restricted classes of functions.
25 citations
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TL;DR: In this paper, a unified framework for the study of the Kolmogorov-Fokker-Planck (KFP) equation is presented. But the framework is not suitable for the analysis of drift-diffusion equations.
Abstract: We use the distances introduced in a previous joint paper to exhibit the gradient flow structure of some drift-diffusion equations for a wide class of entropy functionals. Functional inequalities obtained by the comparison of the entropy with the entropy production functional reflect the contraction properties of the flow. Our approach provides a unified framework for the study of the Kolmogorov-Fokker-Planck (KFP) equation.
11 citations
01 May 2011
TL;DR: In this paper, a review of recent results on existence, symmetry and symmetry breaking of optimal functions for Caffarelli-Kohn-Nirenberg (CKN) and weighted logarithmic Hardy (WLH) inequalities is presented.
Abstract: This contribution is devoted to a review of some recent results on existence, symmetry and symmetry breaking of optimal functions for Caffarelli-Kohn-Nirenberg (CKN) and weighted logarithmic Hardy (WLH) inequalities. These results have been obtained in a series of papers [1–5] in collaboration with M. del Pino, S. Filippas, M. Loss, G. Tarantello and A. Tertikas and are presented from a new viewpoint.
6 citations
TL;DR: In this paper, the non-relativistic Hartree model with attractive Coulomb-Newton interaction was considered and it was proved that minimizers exist if and only if the temperature of the system is below a certain threshold T * > 0 (possibly infinite).
Abstract: We consider the non-relativistic Hartree model in the gravitational case, i.e. with attractive Coulomb–Newton interaction. For a given mass M > 0, we construct stationary states with non-zero temperature T by minimizing the corresponding free energy functional. It is proved that minimizers exist if and only if the temperature of the system is below a certain threshold T* > 0 (possibly infinite), which itself depends on the specific choice of the entropy functional. We also investigate whether the corresponding minimizers are mixed or pure quantum states and characterize a critical temperature \({T_c \in (0, T*)}\) above which mixed states appear.
4 citations
24 Oct 2011
TL;DR: In this article, the difference of the two terms in Sobolev's inequality (with optimal constant) measures a distance to the manifold of the optimal functions, and an explicit estimate of the remainder term and established an improved inequality, with explicit norms and fully detailed constants.
Abstract: The difference of the two terms in Sobolev's inequality (with optimal constant) measures a distance to the manifold of the optimal functions. We give an explicit estimate of the remainder term and establish an improved inequality, with explicit norms and fully detailed constants. Our approach is based on nonlinear evolution equations and improved entropy - entropy production estimates along the associated flow. Optimizing a relative entropy functional with respect to a scaling parameter, or handling properly second moment estimates, turns out to be the central technical issue. This is a new method in the theory of nonlinear evolution equations, which also applies to other interpolation inequalities of Gagliardo-Nirenberg-Sobolev type.
3 citations
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08 Nov 2011TL;DR: In this article, it was shown that a positive term can be added to the quadratic singularity without violating the Hardy inequality, and even a whole asymptotic expansion can be built, with optimal constants for each term.
Abstract: Although the Hardy inequality corresponding to one quadratic singularity, with optimal constant, does not admit any extremal function, it is well known that such a potential can be improved, in the sense that a positive term can be added to the quadratic singularity without violating the inequality, and even a whole asymptotic expansion can be build, with optimal constants for each term. This phenomenon has not been much studied for other inequalities. Our purpose is to prove that it also holds for the gaussian Poincare inequality. The method is based on a recursion formula, which allows to identify the optimal constants in the asymptotic expansion, order by order. We also apply the same strategy to a family of Hardy-Poincare inequalities which interpolate between Hardy and gaussian Poincare inequalities.
TL;DR: In this paper, the extremals of the Caffarelli-Kohn-Nirenberg inequalities in any dimension larger or equal than 2 were shown to be symmetric in a range of parameters for which no explicit results of symmetry were previously known.
Abstract: We prove new symmetry results for the extremals of the Caffarelli-Kohn-Nirenberg inequalities in any dimension larger or equal than 2, in a range of parameters for which no explicit results of symmetry were previously known.
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TL;DR: In this paper, the authors investigated how to relate Sobolev and Hardy-Littlewood-Sobolev inequalities using the flow of a fast diffusion equation in dimension $d\ge3.
Abstract: In the euclidean space, Sobolev and Hardy-Littlewood-Sobolev inequalities can be related by duality. In this paper, we investigate how to relate these inequalities using the flow of a fast diffusion equation in dimension $d\ge3$. The main consequence is an improvement of Sobolev's inequality when $d\ge5$, which involves the various terms of the dual Hardy-Littlewood-Sobolev inequality. In dimension $d=2$, Onofri's inequality plays the role of Sobolev's inequality and can also be related to its dual inequality, the logarithmic Hardy-Littlewood-Sobolev inequality, by a super-fast diffusion equation.