Abstract
The theory contained in the last three papers [2–4], hereafter reprinted, deals with a type of system that is so special that the properties of the strictly hyperbolic operators can be applied. That type of system occurs in Relativity theory.
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References
Leray, J.: Équations hyperboliques non-strictes: contre-exemples, du type De Giorgi, aux théorèmes d’existence et d’unicité. Math. Annalen 162, 228 - 236 (1966).
Leray, J., et Y. Ohya: Systèmes linéaires, hyperboliques non stricts. Colloque sur L’Analyse fonclionnelle. Liège: CBRM 105–144 (1964).
Leray, J., et L. Waelbroeck: Norme formelle d’une fonction composée. Colloque sur L’Analyse fonctionnelle. Liége: CBRM 145–152 (1964).
Leray, J., et Y. Ohya: Équations et systèmes non-linéaires, hyperboliques non-stricts. Math. Annalen 170, 167–205 (1967).
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© 1970 Springer-Verlag Berlin · Heidelberg
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Leray, J. (1970). Non Strictly Hyperbolic Operators. In: Froissart, M. (eds) Hyperbolic Equations and Waves. Springer, Berlin, Heidelberg. https://doi.org/10.1007/978-3-642-87025-5_2
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DOI: https://doi.org/10.1007/978-3-642-87025-5_2
Publisher Name: Springer, Berlin, Heidelberg
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