Propagation of Analytic and Differentlable Singularities for Solutions of Partial Differential Equations

Jean-Michel Bony

Type: Article

Publication Date: 1976-12-31

Citations: 3

DOI: https://doi.org/10.2977/prims/1195196594

Abstract

In the first part of this paper, we study propagation of singularities for solutions of an analytic pseudo-differential equation, the characteristic set of which is a regular involutive manifold. There exists a natural foliation of this manifold, and (theorem 1.7) the analytic singular spectrum of a solution is a union of leaves—this is a joint work P. Schapira. The same result holds for differentiable singular spectrum (wave front) assuming Levi's condition. A similar result had been proved by J. Sjostrand for C°° pseudo-differential equations, but with additional assumptions on complex characteristics [14]. We prove also microlocal solvability for our operators (theorem 1.6). Complete proofs are given in [6] and [4]. In the second part of this paper (§ 4 to 7), we study operators the characteristic set of which contains a regular involutive manifold. The main result (theorem 5.6) is an analogue, for singular spectrum, to Holmgren theorem for support. Applications to propagation of analytic singularities and to uniqueness of Cauchy problem are given. Besides arguments used in the first part, we use results of Kashiwara [11], [12] and direct infinitesimal geometry. A more detailed exposition is given in [5].

Locations

Publications of the Research Institute for Mathematical Sciences - View - PDF

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+ PDF Chat	Fourier integral operators. I	1971	Lars Hörmander
+	Uniqueness theorems and wave front sets for solutions of linear differential equations with analytic coefficients	1971	Lars Hörmander
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+ PDF Chat	Propagation of singularities for operators with multiple involutive characteristics	1976	Johannes Sjöstrand
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+	Hyperfunctions and Pseudo-Differential Equations	1973	Hikosaburo Komatsu
+ PDF Chat	Propagation des singularités différentiables pour une classe d'opérateurs différentiels à coefficients analytiques	1975	Jean-Michel Bony
+	Extensions du théorème de Holmgren	1976	J. M. Bony
+ PDF Chat	Fourier integral operators. II	1972	J. J. Duistermaat Lars Hörmander