THE CAUCHY-KOVALEVSKAYA THEOREM-OLD AND NEW

THE CAUCHY-KOVALEVSKAYA THEOREM-OLD AND NEW

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摘要 The paper surveys interactions between complex and functional-analytic methods in the CauchyKovalevskaya theory. For instance, the behaviour of the derivative of a bounded holomorphic function led to abstract versions of the Cauchy-Kovalevskaya Theorem.Recent trends in the Cauchy-Kovalevskaya theory are based on the concept of associated differential operators. Since an evolution operator may posses several associated operators, initial data may be decomposed into components belonging to different associated spaces.This technique makes it also possible to solve ill-posed initial value problems. The paper surveys interactions between complex and functional-analytic methods in the CauchyKovalevskaya theory. For instance, the behaviour of the derivative of a bounded holomorphic function led to abstract versions of the Cauchy-Kovalevskaya Theorem.Recent trends in the Cauchy-Kovalevskaya theory are based on the concept of associated differential operators. Since an evolution operator may posses several associated operators, initial data may be decomposed into components belonging to different associated spaces.This technique makes it also possible to solve ill-posed initial value problems.

作者 W.Tutschke

机构地区 Graz University of Technology

出处《Analysis in Theory and Applications》 2005年第2期166-175,共10页 分析理论与应用（英文刊）

关键词 abstract versions of the Cauchy-Kovalevskaya theorem interior estimates associated operators decomposition of initial data H. Lewy example generalized analytic functions abstract versions of the Cauchy-Kovalevskaya theorem, interior estimates, associated operators, decomposition of initial data, H. Lewy example, generalized analytic functions

分类号 O174 [理学—基础数学]

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Analysis in Theory and Applications

2005年第2期

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THE CAUCHY-KOVALEVSKAYA THEOREM-OLD AND NEW

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