No.1111
“ÁˆÙ“_˜_‚Æ”÷•ª•û’öŽ®
Singularity theory and Differential equations
Œ¤‹†W‰ï•ñW
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1999/02/01`1999/02/04
•Ÿˆä@•qƒ, Îì@„˜Y
Toshizumi Fukui, Goo Ishikawa
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–Ú@ŽŸ
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1. $S_4$ coverings of $P^2$ and the topology of the complements of sextic curves (Singularity theory and Differential equations)-----1
@@@@‚’m‘åŠw—Šw•”@@@“¿‰i _—Y@(Tokunaga, Hiro-o)
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2. Passing through degenerate points (Singularity theory and Differential equations)------------------------------------------------18
@@@@‰¡•l‘—§‘åŠw‹³ˆçŠw•”@@@¼‘º ®Žj@(Nishimura, Takashi)
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3. 2ŽŸŒ³$W_u$•û’öŽ®‚Æ€’´Šô‰½ŠÖ”‚Ì“ÁˆÙ“_ (“ÁˆÙ“_˜_‚Æ”÷•ª•û’öŽ®)--------------------------------------------------------------------34
@@@@–¼ŒÃ‰®‘åŠw‘½Œ³”—‰ÈŠwŒ¤‹†‰È/ŽO•Hà’c@@@–{ ˜a•F/ˆäŒû ˜aŠî@(Aomoto, Kazuhiko/Iguchi, Kazumoto)
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4. THE TANGENT SEMICONE AND LIMITS OF TANGENT SPACES TO REAL SURFACES (Singularity theory and Differential equations)---------------47
@@@@University of Hawaii@@@Wilson, Leslie
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5. HYPERSURFACES HAVING HIGHER ORDER CONTACT WITH SINGULAR SPACES (Singularity theory and Differential equations)-------------------52
@@@@Department of Mathematics, Jinzhou Normal University/Departamento de Matematica, CCEN, Universidade Federal de Pernambuco@@@Jiang, Guangfeng/Simis, Aron
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6. ASYMPTOTIC BEHAVIOR OF SOLUTIONS TO SINGULARLY PERTURBED ODE OF SINE-GORDON TYPE (Singularity theory and Differential equations)---58
@@@@L“‡‘åŠw‘‡‰ÈŠw•”@@@ŽÄ“c “O‘¾˜Y@(Shibata, Tetsutaro)
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7. Multiple Existence of Entire Solutions for Semilinear Elliptic problems on $R^N$ (Singularity theory and Differential equations)---68
@@@@‰¡•l‘—§‘åŠwHŠw•”@@@•½–ì Ú—Ï@(Hirano, Norimichi)
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8. A SURVEY ON SINGULARITIES OF SOLUTIONS FOR FIRST ORDER PARTIAL DIFFERENTIAL EQUATIONS (Singularity theory and Differential equations)---78
@@@@–kŠC“¹‘åŠw—ŠwŒ¤‹†‰È@@@ò‰® Žüˆê@(Izumiya, Shyuichi)
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9. 2ŠK‘ȉ~Œ^•Î”÷•ª•û’öŽ®‚Ì—ë‰ð‚Ì—ë“_‚ÌŽŸ” (“ÁˆÙ“_˜_‚Æ”÷•ª•û’öŽ®)-------------------------------------------------------------------97
@@@@•ºŒÉ‹³ˆç‘åŠw@@@“n•Ó ‹àŽ¡@(Watanabe, Kinji)
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10. Ginzburg-Landau equation and the zero set of solutions (Singularity theory and Differential equations)-------------------------102
@@@@–kŠC“¹‘åŠw—ŠwŒ¤‹†‰È@@@_•Û Gˆê@(Jimbo, Shuichi)
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11. Introduction to the viscosity solution theory of first order PDEs (Singularity theory and Differential equations)--------------107
@@@@é‹Ê‘åŠw@@@¬’r –κ@(Koike, Shigeaki)
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12. Semicontinuous solutions for Hamilton-Jacobi equations with general Hamiltonians (Singularity theory and Differential equations)---117
@@@@–kŠC“¹‘åŠw—Šw•”/Žº—–H‹Æ‘åŠwHŠw•”@@@‹V‰ä ”üˆê/²“¡ Œ³•F@(Giga, Yoshikazu/Sato, Moto-Hiko)
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13. ÚG\‘¢‚Æ2ŠK•Î”÷•ª•û’öŽ® (“ÁˆÙ“_˜_‚Æ”÷•ª•û’öŽ®)-------------------------------------------------------------------------------125
@@@@‹ž“sŽY‹Æ‘åŠw—Šw•””Šw‹³Žº@@@’Ò Š²—Y@(Tsuji, Mikio)
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14. SINGULARITIES OF VISCOSITY SOLUTIONS OF HAMILTON-JACOBI EQUATIONS (Singularity theory and Differential equations)--------------138
@@@@Independent University of Moscow@@@Bogaevski, Ilia A.
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15. Hopf-Lax formulas for Hamilton-Jacobi equations with semicontinuous initial data (Singularity theory and Differential equations)---144
@@@@“Œ‹ž“s—§‘åŠw—Šw•”@@@Έä mŽi@(Ishii, Hitoshi)
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16. A Note on Invariant Three-Point Curvature Approximations (Singularity theory and Differential equations)-----------------------157
@@@@‰ï’ÑåŠw@@@Belyaev, Alexander G.
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17. A problem on blow-analytic sufficiency of jets (Singularity theory and Differential equations)---------------------------------165
@@@@•ºŒÉ‹³ˆç‘åŠwŠwZ‹³ˆçŠw•”@@@¬’r •qŽi@(Koike, Stoshi)
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18. Problems stated by Guang Feng Jiang (Singularity theory and Differential equations)--------------------------------------------168
@@@@@@@›I L•ô@(Jian, Guang Feng)
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19. Problems stated by Toshizumi Fukui (Singularity theory and Differential equations)--------------------------------------------168*
@@@@@@@•Ÿˆä •qƒ@(Fukui, Toshizumi)
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