Construction BKW pour l'opérateur de Dirac. Cas d'un potentiel périodique
Construction de laplaciens dont une partie finie (avec multiplicités) du spectre est donnée
Construction de paramétrixes pour des opérateurs pseudodifférentiels caractéristiques sur la réunion de deux cônes lissés
Construction de solutions élémentaires dans le faisceau de M. Sato
Construction de solutions nulles et singulières pour des opérateurs de type principal
Construction de solutions pour les équations de Korteweg-de Vries généralisées
Construction de solutions ramifiées autour de deux hypersurfaces caractéristiques simples pour des opérateurs quasi-linéaires
Construction de solutions singulières pour des équations aux dérivées partielles non linéaires
Construction de solutions singulières pour des équations aux dérivées partielles non linéaires
Construction du noyau de Bergman local
Construction d'un inverse et propagation de la régularité des solutions pour un problème de Dirichlet hyperbolique
Construction d'une parametrix microlocale et propagation des singularités sur le bord pour les systèmes hyperboliques
Construction of a natural norm for the convection-diffusion-reaction operator
In this work, we construct, by means of the function space interpolation theory, a natural norm for a generic linear coercive and non-symmetric operator. We look for a norm which is the counterpart of the energy norm for symmetric operators. The natural norm allows for continuity and inf-sup conditions independent of the operator. Particularly we consider the convection-diffusion-reaction operator, for which we obtain continuity and inf-sup conditions that are uniform with respect to the operator...
Construction of a Singular Elliptic-Harmonic Measure.
Construction of Approximative and Almost Periodic Solutions of Perturbed Linear Schrödinger and Wave Equations.
Construction of blowup solutions for the nonlinear Schrödinger equation with critical nonlinearity
Construction of compact constant mean curvature hypersurfaces with topology
In this paper, we explain how the end-to-end construction together with the moduli space theory can be used to produce compact constant mean curvature hypersurfaces with nontrivial topology. For the sake of simplicity, the hypersurfaces we construct have a large group of symmetry but the method can certainly be used to provide many more examples with less symmetries.
Construction of convergent adaptive weighted essentially non-oscillatory schemes for Hamilton-Jacobi equations on triangular meshes
We propose a method of constructing convergent high order schemes for Hamilton-Jacobi equations on triangular meshes, which is based on combining a high order scheme with a first order monotone scheme. According to this methodology, we construct adaptive schemes of weighted essentially non-oscillatory type on triangular meshes for nonconvex Hamilton-Jacobi equations in which the first order monotone approximations are occasionally applied near singular points of the solution (discontinuities of...
Construction of entire solutions for semilinear parabolic equations.
Construction of Green's functions for the Black-Scholes equation.