Keywords
- Differential Equation
- Partial Differential Equation
- Ordinary Differential Equation
- Point Theorem
- Fixed Point Theorem
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Bibliographie
A.K. AZIZ, J.P. MALONEY-An application of Tychonoff's fixed point theorem to hyperbolic paitial differential equations, Math. Annal. 162 (77–82), 1965–66.
G. HECQUET-Existence globale des solutions de quelques problèmes aux limites de type hyperbolique, (à paraître).
B. PALCZEWSKI-On boundedness and stability of solutions of Darboux problem for abstract equations of hyperbolic type in an unbounded domain, Zeszyty naukowe Politechniki gdanskiej, 1969, no 150 (19–51).
G. TEODORU-The Darboux problem for a hyperbolic partial differential equation of second order, Buletinul Institutuliu politehnic din Iasi Tomul XIX (XXIII) fasc. 3–4 (1973).
M. WINANTS-Révolution du problème (ao, IV, 1o), Bull. de l'Acad. Roy. de Belgique, cl. des Sc. XXI, (376–384), 1934.
M. WINANTS-Résolution du problème (ao, IV, 2o), Bull. de l'Acad. Roy. de Belgique, cl. des Sc. XXI (495–503), 1934.
M. WINANTS-Chacun des deux problèmes (ao, III, 3″) et (ao, III,2′) peut être résolu par le moyen d'une équation intégrale ayant un nombre infini de termes, Bull. de l'Acad. Roy. de Belgique, cl. des Sc. XXII (8–25), 1935.
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© 1976 Springer-Verlag
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Hecquet, G. (1976). Existence globale des solutions de queliques problemes aux limites. In: Everitt, W.N., Sleeman, B.D. (eds) Ordinary and Partial Differential Equations. Lecture Notes in Mathematics, vol 564. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0087340
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DOI: https://doi.org/10.1007/BFb0087340
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