18 résultats avec le mot-clé: 'cauchy problem hyperbolic systems gevrey class gevrey indices'
indices of Gevrey classes, in which the Cauchy problem is well-posed, are determined instead by the multiplicities of zeros of the minimal polynomial. of the
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— Well posedness in the Gevrey Classes of the Cauchy Problem for a Non Strictly Hyperbolic Equation with Coefficients Depending On Time, Ann.. — Two by two strongly hyperbolic systems
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KINOSHITA, On the wellposedness in the Gevrey classes of the Cauchy problem for weakly hyperbolic systems with Hölder continuous coefficients in t, preprint. [9]
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Nous reprenons dans cette thèse la méthode développée par Métivier dans [Mét05] dans le cadre initialement elliptique en régularité Sobolev, et l'étendons au cas
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ZANGHIRATI, Fourier integral operators of infinite order on Gevrey spaces applications to the Cauchy problem for certain hyperbolic operators, J. CICOGNANI, The
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We prove that a germ of smooth α-Gevrey vector field with an hyperbolic linear part admits a smooth β-Gevrey transformation to a smooth β-Gevrey normal form.. The Gevrey order β
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We prove that a germ of smooth α-Gevrey vector field with an hyperbolic linear part admits a smooth β-Gevrey transformation to a smooth β-Gevrey normal form.. The Gevrey order β
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This paper is devoted to the study of the Cauchy problem in C ~ and in the Gevrey classes for some second order degenerate hyperbolic equations with time dependent
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On the other hand, in [Br], M.D.Bronˇ stein has proved that the Cauchy problem for weakly hyperbolic equations and systems is well posed in Gevrey spaces G s for s ≤ 1+1/(m−1) where
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S PAGNOLO , Wellposedness in the Gevrey classes of the Cauchy problem for a non strictly hyperbolic equation with coefficients depending on time, Ann.. K AJITANI , Local solution
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Key words: Hyperbolic systems, Riemann problem, Cauchy problem, strong Riemann invariants, Temple class, chemical engineering, Langmuir
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KITAGAWA, Sur des conditions nécessaries pour les équations en évolution pour gue le problème de Cauchy soit bien posé dans les classes de fonctions C~II,
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— In this paper we prove that the Cauchy problem for first-order quasi-linear systems of partial differential equations is ill-posed in Gevrey spaces, under the assumption of an
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Gevrey Chambertin 1er Cru Champeaux, Tortochot 04/17 Gevrey Chambertin Les Seuvrees, Robert Groffier 2014 Gevrey Chambertin Louis Latour 2016. Gevrey Chambertin, Philippe
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Universidad Complutense de Madrid MARIA ANTONIA GARCÍA LEÓN Universidad Complutense de Madrid EULOGIO GARCÍA VALLINAS Universidad de Cádiz.
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Pour imposer le potentiel il faut pouvoir accéder à l’intérieur de la cellule, il faut un potentiel de commande choisi par l’expérimentateur et un appareil capable de comparer
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