Theory of (Vector-Valued) Sato Hyperfunctions on a Real-Analytic Manifold

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概要

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• In this article, we realize Sato hyperfunctions and Frechet-space-valued Sato hyperfunctions on a real-analytic manifold by the algebro-analytic method. Then we prove the equivalence of the above and the correspondent realized independently by the duality method, Ito [7]. In several points, we improve the methods of proof of important theorems. Thereby the method of constructing the theory becomes clear and evident.

• 徳島大学の論文
• 2002-01-31

著者

• Ito Yoshifumi

  Faculty Of Integrated Arts And Sciences The University Of Tokushima

関連論文

• Theory of Infraexponential Holomorphic Functions
• Theory of (Vector-Valued) Sato Hyperfunctions on a Real-Analytic Manifold
• Theory of General Fourier Hyperfunctions
• Methods of Renormalization and Distributions

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