No.704

No.704

超函数論の函数解析的研究

Functional Analysis Concerning of Hyperfunction

　

1987/07/06～1987/07/08

小松　彦三郎

KOMATSU,HIKOSABURO

　

目　次

　

1. Solvability of convolution equations in Gevrey classes of Roumieu type(Functional-Analytic Study of Generalized Functions)--------1

　　　　Dusseldorf Univ. / Dusseldorf Univ. / Dusseldorf Univ.　　　Braun, Rudiger W. / Meise, Reinhold / Vogt, Dietmar

　

2. On the Irregularity of Dx-module(Functional-Analytic Study of Generalized Functions)----------------------------------------------7

　　　　Department of Mathematics, Hitotsubashi University　　　真島秀行　(MAJIMA, Hideyuki)

　

3. Fourier hyperfunctions of general type(Functional-Analytic Study of Generalized Functions)---------------------------------------18

　　　　Department of Mathematics, Tokushima University　　　伊東由文　(Ito, Yoshifumi)

　

4. AN APPLICATION OF THE SECOND MICROLOCALIZATION AT THE BOUNDARY TO THE EXTENSION OF SOLUTIONS OF DIFFERENTIAL SYSTEMS(Functional-Analytic Study of Generalized Functions)---28

　　　　Padova Univ.　　　Zampieri, Giuseppe

　

5. Boundary Value Theory for Pseudo-Differential Operators(Functional-Analytic Study of Generalized Functions)----------------------37

　　　　Department of Mathematics, Tokyo Metropolitan Univ.　　　片岡清臣　(Kataoka, Kiyomi)

　

6. 2-Microlocal Boundary Value Problems and Their Applications(Functional-Analytic Study of Generalized Functions)------------------39

　　　　Univ, of Tokyo　　　内田素夫　(Uchida, Motoo)

　

7. Propagation of micro-unalyticities of solutions to some class of linear differential equations with non-involutive double characteristics(Functional-Analytic Study of Generalized Functions)---43

　　　　東京大学理学部　　　長谷川研二　(Hasegawa, Kenji)

　

8. 2nd Microlocalization in the Gevrey classes : after S. Kishida(Functional-Analytic Study of Generalized Functions)---------------57

　　　　Faculty of Science, Univ. of Tokyo　　　戸瀬信之　(Tose, Nobuyuki)

　

9. Sur des conditions necessaires pour l'equation d'evolution pour que le probleme de Cauchy soit bien pose dans la classe de Gevrey(Functional-Analytic Study of Generalized Functions)---68

　　　　愛媛大学理学部　　　北川桂一郎　(KITAGAWA, Keiichiro)

　

10. Well-posedness of the Cauchy problem for systems in a complex domain : as an application of the determinant theory(Functional-Analytic Study of Generalized Functions)---77

　　　　名古屋大学教養部　　　三宅正武　(MIYAKE, Masatake)

　

11. 正則解の大域的存在と陪特性曲線(超函数論の函数解析的研究)------------------------------------------------------------------------95

　　　　京都大学理学部　　　竹井義次　(Takei, Yoshitsugu)

　

12. 無限次元射影空間上の擬凸領域について(超函数論の函数解析的研究)-----------------------------------------------------------------114

　　　　福岡工業大学　　　西原賢　(Nishihara, Masaru)

　