Hyperfunctions and Pseudo-Differential Equations: Proceedings of a Conference at Katata, 1971Hikosaburo Komatsu Springer, 15 nov. 2006 - 534 pages |
Table des matières
Edge of the wedge theorem and hyperfunction | 41 |
Solutions hyperfonctions | 81 |
On the global existence of real analytic | 99 |
Fundamental principle and extension of solutions | 122 |
CONFERENCE AT RIMS | 133 |
On a Markovian property | 153 |
Ultradistributions and hyperfunctions | 164 |
APPENDICES | 180 |
Relative cohomology of sheaves of solutions | 192 |
PART II | 262 |
Several operations on hyperfunctions and micro functions | 286 |
Foundation of the Theory of Pseudodifferential | 315 |
Algebraic properties of the sheaf of pseudodifferential | 384 |
Autres éditions - Tout afficher
Hyperfunctions and Pseudo-differential Equations: Proceedings of a ... Hikosaburō Komatsu Affichage d'extraits - 1973 |
Hyperfunctions and Pseudo-Differential Equations: Proceedings of a ... Hikosaburo Komatsu Affichage d'extraits - 1973 |
Expressions et termes fréquents
analytique bicharacteristic boundary values canonical Cauchy closed linear operator closed set cohomology groups compact set complex neighbourhood constant coefficients contact transformation convex set defining function denote distribution dual space Ehrenpreis elementary solutions elliptic equations with constant exact sequence exists following theorem Hence holomorphic functions homogeneous Hörmander hyper hyperfunction hyperfunction solutions implies isomorphism Kashiwara Kawai Komatsu Lemma Malgrange mapping Martineau Math microfunction neighborhood open convex open set ouvert overdetermined systems P₁ partial differential equations Proc proof of Theorem prove pseudo-differential equations pseudo-differential operator real analytic functions real analytic manifold real analytic solutions relative cohomology resp restriction satisfies Sato sheaf sheaves singular support space Stein submanifold subset subspace Suppose théorème theory of hyperfunctions Tokyo topology Univ V₁ vanishes voisinage wedge theorem x+iy zero