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Literatur
Achieser, N. I., u.I. M. Glasmann: Theorie der linearen Operatoren im Hilbertraum. Berlin: Akademie-Verlag 1954.
Bourbaki, N.: Espaces vectoriels topologiques. B.1 (1953), B.2 (1955). Paris: Hermann.
Friedrichs, K. O.: Differentiability of solutions of linear elliptic differential equations. Comm. Pure and Appl. Math.6, 299–326 (1953).
Gårding, L.: Dirichlet's problem for linear elliptic partial differential equations. Math. scand.1, 55–72 (1953).
Hörmander, L.: On the interior regularity of the solutions of partial differential equations. Comm. Pure and Appl. Math.11, 197–218 (1958).
Hörmander, L.: On the theory of general partial differential operators. Acta Math.94, 161–247 (1955).
Lax, P.: On the Cauchy problem for hyperbolic equations ... Comm. Pure and Appl. Math. VIII, 615–633 (1955).
Malgrange, B.: Existence et aproximation des solutions des équations aux derivées partielles ... (Thèse). Ann. Inst. Fourier6, 271–354 (1955–1956).
Malgrange, B.: Sur une classe d'opérateurs différentiels hypoelliptiques. Bull. Soc. Math. France85, 283–306 (1957).
Schwartz, L.: Ecuaciones diferenciales parciales elípticas. Herausgegeben von Universidad Nacional de Colombia. Bogotá 1956.
Schwartz, L.: Théorie des Distributions. B.1 (1957), B.2 (1959). Paris: Hermann.
Weyl, H.: The method of orthogonal projection in potential theory. Duke J.7, 411–444 (1940).
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Diese Arbeit wurde als Dissertation von der Naturwiss.-Math. Fakultät der Universität Heidelberg angenommen.
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Nieto, J. Eine Charakterisierung der elliptischen Differentialoperatoren. Math. Ann. 141, 22–42 (1960). https://doi.org/10.1007/BF01367448
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DOI: https://doi.org/10.1007/BF01367448