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  5. Approximation of the Cubic Functional Equations in Lipschitz Spaces

Approximation of the Cubic Functional Equations in Lipschitz Spaces

来源 :分析、理论与应用(英文版) | 被引量 : 0次 | 上传用户:allenwyh
【摘 要】
Let G be an Abelian group and letρ:G×G→[0,∞) be a metric on G. Let E be a normed space. We prove that under some conditions if f:G→E is an odd function and
【作 者】
A Ebadian N Ghobadipour I Niko 
【机 构】
Department of Mathematics
【出 处】
分析、理论与应用(英文版)
【发表日期】
2004年期
【关键词】
Cubic functional equation Lipschitz space stability 
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Let G be an Abelian group and letρ:G×G→[0,∞) be a metric on G. Let E be a normed space. We prove that under some conditions if f:G→E is an odd function and Cx:G→E defined by Cx(y):=2 f (x+y)+2 f (x?y)+12 f (x)?f (2x+y)?f (2x?y) is a cubic function for all x∈G, then there exists a cubic function C:G→E such that f?C is Lipschitz. Moreover, we investigate the stability of cubic functional equation 2 f (x+y)+2 f (x?y)+12 f (x)?f (2x+y)?f (2x?y)=0 on Lipschitz spaces.
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