Add to ORKGInternational audienceWe investigate the existence of invariant measures for self-stabilizing diffusions. These stochastic processes represent roughly the behavior of some Brownian particle moving in a double-well landscape and attracted by its own law. This specific self-interaction leads to nonlinear stochastic differential equations and permits to point out singular phenomenons like non uniqueness of associated stationary measures. The existence of several invariant measures is essentially based on the non convex environment and requires generalized Laplace's method approximations
International audienceWe study a kinetic Vlasov/Fokker-Planck equation perturbed by a stochastic for...
AbstractTaking an odd, non-decreasing function β, we consider the (nonlinear) stochastic differentia...
Liu W, Tölle J. EXISTENCE AND UNIQUENESS OF INVARIANT MEASURES FOR STOCHASTIC EVOLUTION EQUATIONS WI...
AbstractWe investigate the existence of invariant measures for self-stabilizing diffusions. These st...
We investigate the existence of invariant measures for self-stabilizing diffusions. These stochastic...
AbstractWe investigate the existence of invariant measures for self-stabilizing diffusions. These st...
Second versionIn the context of self-stabilizing processes, that is processes attracted by their own...
International audienceSelf-stabilizing diffusions are stochastic processes, solutions of nonlinear s...
summary:The paper presents a review of some recent results on uniqueness of invariant measures for s...
summary:The paper presents a review of some recent results on uniqueness of invariant measures for s...
We investigate the convergence of McKean-Vlasov diffusions in a non-convex landscape. These processe...
Les processus auto-stabilisants sont définis comme des solutions d'équations différentielles stochas...
"Stochastic Analysis on Large Scale Interacting Systems". October 26~29, 2015. edited by Ryoki Fukus...
The subject of my thesis is the McKean-Vlasov diffusion. The motion of the process is subject to thr...
AbstractTaking an odd, non-decreasing function β, we consider the (nonlinear) stochastic differentia...
International audienceWe study a kinetic Vlasov/Fokker-Planck equation perturbed by a stochastic for...
AbstractTaking an odd, non-decreasing function β, we consider the (nonlinear) stochastic differentia...
Liu W, Tölle J. EXISTENCE AND UNIQUENESS OF INVARIANT MEASURES FOR STOCHASTIC EVOLUTION EQUATIONS WI...
AbstractWe investigate the existence of invariant measures for self-stabilizing diffusions. These st...
We investigate the existence of invariant measures for self-stabilizing diffusions. These stochastic...
AbstractWe investigate the existence of invariant measures for self-stabilizing diffusions. These st...
Second versionIn the context of self-stabilizing processes, that is processes attracted by their own...
International audienceSelf-stabilizing diffusions are stochastic processes, solutions of nonlinear s...
summary:The paper presents a review of some recent results on uniqueness of invariant measures for s...
summary:The paper presents a review of some recent results on uniqueness of invariant measures for s...
We investigate the convergence of McKean-Vlasov diffusions in a non-convex landscape. These processe...
Les processus auto-stabilisants sont définis comme des solutions d'équations différentielles stochas...
"Stochastic Analysis on Large Scale Interacting Systems". October 26~29, 2015. edited by Ryoki Fukus...
The subject of my thesis is the McKean-Vlasov diffusion. The motion of the process is subject to thr...
AbstractTaking an odd, non-decreasing function β, we consider the (nonlinear) stochastic differentia...
International audienceWe study a kinetic Vlasov/Fokker-Planck equation perturbed by a stochastic for...
AbstractTaking an odd, non-decreasing function β, we consider the (nonlinear) stochastic differentia...
Liu W, Tölle J. EXISTENCE AND UNIQUENESS OF INVARIANT MEASURES FOR STOCHASTIC EVOLUTION EQUATIONS WI...