Ternary Jordan C*-derivations in C*-ternary algebras.

E. Rashidi; M. Eshaghi

Ternary Jordan C-derivations in C-ternary algebras.

E. Rashidi, M. Eshaghi

Semnan University

Research output: Contribution to journal › Article › Academic

Abstract

We say a functional equation (ξ) is stable if any function g satisfying the equation (ξ) approximately is near to true solution of (ξ). In this paper, we prove the Generalized Hyers-Ulam stability of ternary Jordan *-derivations in C*-ternary algebras for the following generalized Cauchy-Jensen additive mapping: (These equations cannot be represented into ASCII text).

Original language	Undefined/Unknown
Journal	Journal of Computational Analysis and Applications
Publication status	Published - Jan 2010
Externally published	Yes

Cite this

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title = "Ternary Jordan C*-derivations in C*-ternary algebras.",

abstract = "We say a functional equation (ξ) is stable if any function g satisfying the equation (ξ) approximately is near to true solution of (ξ). In this paper, we prove the Generalized Hyers-Ulam stability of ternary Jordan *-derivations in C*-ternary algebras for the following generalized Cauchy-Jensen additive mapping: (These equations cannot be represented into ASCII text).",

author = "E. Rashidi and M. Eshaghi",

year = "2010",

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journal = "Journal of Computational Analysis and Applications",

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AU - Eshaghi , M.

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AB - We say a functional equation (ξ) is stable if any function g satisfying the equation (ξ) approximately is near to true solution of (ξ). In this paper, we prove the Generalized Hyers-Ulam stability of ternary Jordan *-derivations in C*-ternary algebras for the following generalized Cauchy-Jensen additive mapping: (These equations cannot be represented into ASCII text).

M3 - Article

SN - 1521-1398

JO - Journal of Computational Analysis and Applications

JF - Journal of Computational Analysis and Applications

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