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Abstrakty
In this paper, we study the following nonlinear first order partial differential equation: [formula] The purpose of this paper is to determine the estimate of Gevrey order under the condition that the equation is singular of a totally characteristic type. The Gevrey order is indicated by the rate of divergence of a formal power series. This paper is a continuation of the previous papers [Convergence of formal solutions of singular first order nonlinear partial differential equations of totally characteristic type, Funkcial. Ekvac. 45 (2002), 187-208] and [Maillet type theorem for singular first order nonlinear partial differential equations of totally characteristic type, Surikaiseki Kenkyujo Kokyuroku, Kyoto University 1431 (2005), 94-106]. Especially the last-mentioned paper is regarded as part I of this paper.
Czasopismo
Rocznik
Tom
Strony
689--712
Opis fizyczny
Bibliogr. 19 poz,
Twórcy
autor
- Sugiyama Jogakuen University, School of Education Department of Child Development 17-3 Hoshigaoka Motomachi Chikusa, Nagoya, 464-8662, Japan
Bibliografia
- [1] H. Chen, Z. Luo, On the holomorphic solution of non-linear totally characteristic equations with several space variables, Preprint 99/23, November 1999, Institute fur Math-ematik, Universitat Potsdam.
- [2] H. Chen, Z. Luo, H. Tahara, Formal solutions of nonlinear first order totally characteristic type PDE with irregular singularity, Ann. Inst. Fourier (Grenoble) 51 (2001) 6, 1599-1620.
- [3] H. Chen, H. Tahara, On totally characteristic type non-linear partial differential equations in complex domain, Publ. RIMS. Kyoto Univ. 35 (1999), 621-636.
- [4] R. Gerard, H. Tahara, Singular nonlinear partial differential equations, Vieweg, 1996.
- [5] M. Hibino, Divergence property of formal solutions for singular first order linear partial differential equations, Publ. RIMS, Kyoto Univ. 35 (1999), 893-919.
- [6] M. Miyake, A. Shirai, Convergence of formal solutions of first order singular nonlinear-partial differential equations in complex domain, Ann. Polon. Math. 74 (2000), 215-228.
- [7] M. Miyake, A. Shirai, Structure of formal solutions of nonlinear first order singular partial differential equations in complex domain, Funkcial. Ekvac. 48 (2005), 113-136.
- [8] M. Miyake, A. Shirai, Two proofs for the convergence of formal solutions of singular first order nonlinear partial differential equations in complex domain, Surikaiseki Kenkyujo Kokyuroku Bessatsu, Kyoto Unviversity B37 (2013), 137-151.
- [9] T. Oshima, On the theorem of Cauchy-Kowalevski for first order linear differential equations with degenerate principal symbols, Proc. Japan Acad. 49 (1973), 83-87.
- [10] T. Oshima, Singularities in contact geometry and degenerate psude-differential equations, Journal of the Faculty of Science, The University of Tokyo 21 (1974), 43-83.
- [11] J.P. Ramis, Devissage Gevrey, Asterisque 59/60 (1978), 173-204.
- [12] A. Shirai, Maillet type theorem for nonlinear partial differential equations and Newton polygons, J. Math. Soc. Japan 53 (2001), 565-587.
- [13] A. Shirai, Convergence of formal solutions of singular first order nonlinear partial differential equations of totally characteristic type, Funkcial. Ekvac. 45 (2002), 187-208.
- [14] A. Shirai, A Maillet type theorem for first order singular nonlinear partial differential equations, Publ. RIMS. Kyoto Univ. 39 (2003), 275-296.
- [15] A. Shirai, Maillet type theorem for singular first order nonlinear partial differential equations of totally characteristic type, Surikaiseki Kenkyujo Kokyuroku, Kyoto University 1431 (2005), 94-106.
- [16] A. Shirai, Alternative proof for the convergence or formal solutions of singular first order-nonlinear partial differential equations, Journal of the School of Education, Sugiyama Jogakuen University 1 (2008), 91-102.
- [17] A. Shirai, Gevrey order of formal solutions of singular first order nonlinear partial differential equations of totally characteristic type, Journal of the School of Education, Sugiyama Jogakuen University 6 (2013), 159-172.
- [18] H. Yamazawa, Newton polyhedrons and a formal Gevrey space of double indices for linear partial differential operators, Funkcial. Ekvac. 41 (1998), 337-345.
- [19] H. Yamazawa, Formal Gevrey class of formal power series solution for singular first order linear partial differential operators, Tokyo J. Math. 23 (2000), 537-561.
Typ dokumentu
Bibliografia
Identyfikator YADDA
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