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

— 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

KINOSHITA, On the wellposedness in the Gevrey classes of the Cauchy problem for weakly hyperbolic systems with Hölder continuous coefficients in t, preprint. [9]

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

ZANGHIRATI, Fourier integral operators of infinite order on Gevrey spaces applications to the Cauchy problem for certain hyperbolic operators, J. CICOGNANI, The

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

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

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

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

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

Key words: Hyperbolic systems, Riemann problem, Cauchy problem, strong Riemann invariants, Temple class, chemical engineering, Langmuir

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,

— 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

Gevrey Chambertin 1er Cru Champeaux, Tortochot 04/17 Gevrey Chambertin Les Seuvrees, Robert Groffier 2014 Gevrey Chambertin Louis Latour 2016. Gevrey Chambertin, Philippe

Universidad Complutense de Madrid MARIA ANTONIA GARCÍA LEÓN Universidad Complutense de Madrid EULOGIO GARCÍA VALLINAS Universidad de Cádiz.

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

[r]

In this section, we prove that the Cauchy problem (1.3) enjoys the Gelfand-Shilov regularizing properties with respect to the velocity variable v and Gevrey regularizing properties