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Solutions globales ( - < t < + ) des systèmes paraboliques de lois de conservation

Denis Serre (1998)

Annales de l'institut Fourier

Nous considérons ici des solutions particulières des systèmes paraboliques de lois de conservation dans le domaine x > 0 ou bien pour x : t u + x f ( u ) = x 2 u . Nous faisons l’hypothèse que le système réduit t u + x f ( u ) = 0 est hyperbolique. Notre but est la description de l’interaction d’ondes simples, mono-dimensionnelles, le plus souvent deux ondes exactement. L’une d’elle, au moins, est une onde de choc (pour le système réduit) visqueuse (pour le système parabolique). Il y a donc a priori un champ caractéristique vraiment non linéaire....

Stability of hydrodynamic model for semiconductor

Massimiliano Daniele Rosini (2005)

Archivum Mathematicum

In this paper we study the stability of transonic strong shock solutions of the steady state one-dimensional unipolar hydrodynamic model for semiconductors in the isentropic case. The approach is based on the construction of a pseudo-local symmetrizer and on the paradifferential calculus with parameters, which combines the work of Bony-Meyer and the introduction of a large parameter.

Stabilization of Galerkin approximations of transport equations by subgrid modeling

Jean-Luc Guermond (2010)

ESAIM: Mathematical Modelling and Numerical Analysis

This paper presents a stabilization technique for approximating transport equations. The key idea consists in introducing an artificial diffusion based on a two-level decomposition of the approximation space. The technique is proved to have stability and convergence properties that are similar to that of the streamline diffusion method.

Sulle soluzioni di equazioni alle derivate parziali del primo ordine in insiemi di perimetro finito

Antonio Leaci (1981)

Atti della Accademia Nazionale dei Lincei. Classe di Scienze Fisiche, Matematiche e Naturali. Rendiconti Lincei. Matematica e Applicazioni

In this paper we study boundary value problems for first order partial differential equations on sets of finite perimeter in the sense of De Giorgi (see [7]). We also study a new type of boundary value problems which has been suggested by issues about the bounce problem.

Sur la stabilité des couches limites de viscosité

Denis Serre (2001)

Annales de l’institut Fourier

Pour un système parabolique de lois de conservation, nous considérons le problème mixte, dans le domaine x > 0 . Pour une condition de Dirichlet, le système admet en général des solutions stationnaires U ( x ) , qui tendent vers une limite en + . Ce sont les profils des couches limites, dans l’approximation du second ordre, pour le système hyperbolique du premier ordre sous-jacent. La stabilité de cette couche limite est liée à la stabilité linéaire asymptotique de U . On étudie celle-ci au moyen d’une fonction d’Evans,...

Symmetric hyperbolic systems with boundary conditions that do not satisfy the Kreiss-Sakamoto condition

Matthias Eller (2008)

Applicationes Mathematicae

Symmetric hyperbolic systems with a class of non-homogeneous boundary conditions that do not satisfy the Kreiss-Sakamoto condition (or uniform Lopatinskii condition) are discussed. The boundary conditions are of conservative type. An energy estimate which provides interior and boundary regularity for weak solutions to the system is proved. The results are valid for operators with rough coefficients. As an example the anisotropic Maxwell system is considered.

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