Excluding blowup at zero points of the potential by means of Liouville-type theorems - Archive ouverte HAL Accéder directement au contenu
Pré-Publication, Document De Travail Année :

Excluding blowup at zero points of the potential by means of Liouville-type theorems

(1) , (2)
1
2
Jong-Shenq Guo
  • Fonction : Auteur
  • PersonId : 904502

Résumé

We consider the diffusive Hamilton-Jacobi equation, with homogeneous Dirichlet conditions and regular initial data. It is known from [Barles-DaLio, 2004] that the problem admits a unique, continuous, global viscosity solution, which extends the classical solution in case gradient blowup occurs. We study the question of the possible loss of boundary conditions after gradient blowup, which seems to have remained an open problem till now. Somewhat surprisingly, our results show that the issue strongly depends on the initial data and reveal a rather rich variety of phenomena. For any smooth bounded domain, we construct initial data such that the loss of boundary conditions occurs everywhere on the boundary, as well as initial data for which no loss of boundary conditions occurs in spite of gradient blowup. Actually, we show that the latter possibility is rather exceptional. More generally, we show that the set of the points where boundary conditions are lost, can be prescribed to be arbitrarily close to any given open subset of the boundary.
Fichier principal
Vignette du fichier
1605.03558.pdf (283.88 Ko) Télécharger le fichier
Origine : Fichiers produits par l'(les) auteur(s)
Loading...

Dates et versions

hal-01515044 , version 1 (27-04-2017)

Identifiants

Citer

Jong-Shenq Guo, Philippe Souplet. Excluding blowup at zero points of the potential by means of Liouville-type theorems. 2016. ⟨hal-01515044⟩

Relations

144 Consultations
104 Téléchargements

Altmetric

Partager

Gmail Facebook Twitter LinkedIn More