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Existence and non-existence of null-solutions for some non-Fuchsian partial differential operators with T-dependent coefficients

Published online by Cambridge University Press:  22 January 2016

Takeshi Mandai
Takeshi Mandai*
Affiliation:
Department of Mathematics, Faculty of General Education, Gifu University, Yanagido, Gifu 501-11, Japan
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Since M.S. Baouendi and C. Goulaouic ([2], [3]) defined partial differential operators of Fuchs type and proved theorems of Cauchy-Kowalevskaya type and Holmgren type, many authors have investigated operators of Fuchs type in various categories, that is, real-analytic, C and so on. (Cf. [1], [4], [6], [8], [9], [11], [12], [17], [18], [19], [20], [21] etc.)

Type
Research Article
Information
Nagoya Mathematical Journal , Volume 122 , June 1991 , pp. 115 - 137
Copyright
Copyright © Editorial Board of Nagoya Mathematical Journal 1991

References

[1] Alinhac, S., Problèmes de Cauchy pour des opérateurs singuliers, Bull. Soc. Math. France, 102 (1974), 289315.Google Scholar
[2] Baouendi, M. S. and Goulaouic, C., Cauchy problems with characteristic initial hypersurface, Comm. Pure Appl. Math., 26 (1973), 455475.Google Scholar
[3] Baouendi, M. S. and Goulaouic, C., Cauchy problems with multiple characteristics in spaces of regular distributions, Russ. Math. Surveys, 29 (1974), 7278.Google Scholar
[4] Bove, A., Lewis, J. E. and Parenti, C., Structure properties of solutions of some Fuchsian hyperbolic equations, Math. Ann., 273 (1986), 553571.Google Scholar
[5] Elschner, J., Singular Ordinary Differential Operators and Pseudodifferential Equations, Springer Lecture Notes in Mathematics, 1128 (1985).Google Scholar
[6] Hasegawa, Y., On the initial-value problems with data on a characteristic hypersurface, J. Math. Kyoto Univ., 13 (1973), 579593.Google Scholar
[7] Helffer, B. and Kannai, Y., Determining factors and hypoellipticity of ordinary differential operators with double “characteristics”, Astérisque, 23 (1973), 197216.Google Scholar
[8] Igari, K., Les équations aux dérivées partielles ayant des surfaces caractéristiques du type de Fuchs, Comm. in Partial Differ. Equations, 10 (1985), 14111425.Google Scholar
[9] Igari, K., Non-unicité dans le problème de Cauchy caractéristique — Cas de type de Fuchs—, J. Math. Kyoto Univ., 25 (1985), 341355.Google Scholar
[10] Ince, E. L., Ordinary Differential Equations, Dover, New York, 1956.Google Scholar
[11] Itoh, S. and Uryu, H., Conditions for well-posedness in Gevrey classes of the Cauchy problems for Fuchsian hyperbolic operators II, Publ. RIMS, Kyoto Univ., 23 (1987), 215241.Google Scholar
[12] Kashiwara, M. and Oshima, T., Systems of differential equations with regular singularities and their boundary value problems, Ann. of Math., 106 (1977), 145200.Google Scholar
[13] Kuznetsov, A. N., Differentiate solutions to degenerate systems of ordinary equations, Funct. Anal. Appl., 6 (1972), 119127.Google Scholar
[14] Malgrange, B., Sur les points singuliers des équations différentielles, L’Ens. Math., 20 (1974), 147176.Google Scholar
[15] Mandai, T., Existence of C null-solutions and behavior of bicharacteristic curves for differential operators with C coefficients, Japan. J. Math., 15 (1989), 5363.Google Scholar
[16] Ōuchi, S., Existence of singular solutions and null solutions for linear partial differential operators, J. Fac. Sci. Univ. Tokyo, Sect. IA, Math., 3.2 (1985), 457498.Google Scholar
[17] Roberts, G. B., Uniqueness in the Cauchy problem for characteristic operators of Fuchsian type, J. Diff. Equations, 38 (1980), 374392.Google Scholar
[18] Tahara, H., Fuchsian type equations and Fuchsian hyperbolic equations, Japan. J. Math., 5 (1979), 245347.Google Scholar
[19] Tahara, H., Singular hyperbolic systems. I, Existence, uniqueness and differentiability. II, Pseudo-differential operators with a parameter and their applications to singular hyperbolic systems. III, On the Cauchy problem for Fuchsian hyperbolic partial differential equations. IV, Remarks on the Cauchy problem for singular hyperbolic partial differential equations. V, Asymptotic expansions for Fuchsian hyperbolic differential equations. VI, Asymptotic analysis for Fuchsian hyperbolic equations in Gevrey classes, J. Fac. Sci. Univ. Tokyo, Sect. IA, Math., 26 (1979), 213238 and 391412, 27 (1980), 465507, Japan. J. Math., 8 (1982), 297308, J. Math. Soc. Japan, 36 (1984), 449473, 39 (1987), 551580.Google Scholar
[20] Tsuno, Y., On the prolongation of local holomorphic solutions of partial differential equations, III, equations of the Fuchsian type, J. Math. Soc. Japan, 28 (1976), 611616.Google Scholar
[21] Uryu, H., Conditions for well-posedness in Gevrey classes of the Cauchy problems for Fuchsian hyperbolic operators, Publ. RIMS, Kyoto Univ., 21 (1985), 355383.Google Scholar