Stability of Cubic Functional Equation in Three Variables

Stability of Cubic Functional Equation in Three Variables

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摘要 In this paper, we prove a generalization of Hyers＇ theorem on the sta- bility of approximately additive mapping and a generalization of Badora＇s theorem on approximate ring homomorphism. We also obtain more general stability theorem, which gives stability theorems on Jordan and Lie homomorphisms. The proofs of the theorems in this paper are given following essentially the Hyers-Rassias approach to the stability of the functional equations connected with Ulam＇s problem. In this paper, we prove a generalization of Hyers＇ theorem on the sta- bility of approximately additive mapping and a generalization of Badora＇s theorem on approximate ring homomorphism. We also obtain more general stability theorem, which gives stability theorems on Jordan and Lie homomorphisms. The proofs of the theorems in this paper are given following essentially the Hyers-Rassias approach to the stability of the functional equations connected with Ulam＇s problem.

作者 Yang A-li Cheng Li-hua Ji You-qing

机构地区 School of Science

出处《Communications in Mathematical Research》 CSCD 2013年第4期289-296,共8页 数学研究通讯（英文版）

基金 The NSF(11101323)of China the SRP(12JK0879)of Shaanxi Education Office

关键词 STABILITY functional equation Lie homomorphism stability, functional equation, Lie homomorphism

分类号 O174 [理学—数学] TP271 [理学—基础数学]

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Stability of Cubic Functional Equation in Three Variables

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