Saı̈d Benachour scite author profile

The large time behavior of solutions to the Cauchy problem for the viscous Hamilton-Jacobi equation u t − ∆u + |∇u| q = 0 is classified. If q > q c := (N + 2)/(N + 1), it is shown that non-negative solutions corresponding to integrable initial data converge in W 1,p (R N ) as t → ∞ toward a multiple of the fundamental solution for the heat equation for every p ∈ [1, ∞] (diffusion-dominated case). On the other hand, if 1 < q < q c , the large time asymptotics is given by the very singular self-similar solutions of the viscous Hamilton-Jacobi equation.2000 Mathematics Subject Classification: 35K15, 35B40. RésuméNous classifions le comportement asymptotique des solutions du problème de Cauchy pour l'équation de Hamilton-Jacobi avec diffusion u t −∆u+|∇u| q = 0. Si q > q c := (N +2)/(N +1), nous montrons que, lorsque t → ∞, les solutions intégrables et positives convergent dans W 1,p (R N ) vers un multiple de la solution fondamentale de l'équation de la chaleur pour tout p ∈ [1, ∞] (diffusion dominante). Ensuite, si 1 < q < q c , le comportement asymptotique est décrit par la solution très singulière auto-similaire de l'équation de Hamilton-Jacobi avec diffusion.En ce qui concerne les solutions intégrables et négatives, la situation est plus complexe. Le terme de diffusion est de nouveau dominant si q ≥ 2, ainsi que lorsque q c < q < 2 pourvu que la donnée initiale soit suffisamment petite. Ensuite, pour 1 < q < 2, nous identifions une classe de données initiales pour laquelle le comportement asymptotique des solutions est donné par une solution de viscosité auto-similaire de l'équation de Hamilton-Jacobi z t + |∇z| q = 0 avec la condition initiale (non continue) z(x, 0) = 0 si x = 0 et z(0, 0) < 0.

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Nonlinear self-stabilizing processes – II: Convergence to invariant probability

Benachour

Roynette

Vallois

1998

Stochastic Processes and their Applications

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Analyticité des solutions des équations d'Euler

Benachour¹

1979

Arch. Rational Mech. Anal.

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Saı̈d Benachour

Nonlinear self-stabilizing processes – I Existence, invariant probability, propagation of chaos

Global solutions to viscous hamilton-jacob1 equations with irregular initial data

Asymptotic profiles of solutions to viscous Hamilton–Jacobi equations

Nonlinear self-stabilizing processes – II: Convergence to invariant probability

Analyticité des solutions des équations d'Euler

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