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| Volume 36 • Number 3 • 2013 |
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On Newton-Like Method for Solving Generalized Nonlinear Operator Equations in Banach Spaces
D. R. Sahu and Krishna Kumar Singh
Abstract.
The purpose of this paper is to prove existence and uniqueness theorem for solving an operator equation of the form $F(x)+G(x)=0$, where $F$ is a G\^{a}teaux differentiable operator and $G$ is a Lipschitzian operator defined on an open convex subset of a Banach space. Our result extends and improves the previously known results in recent literature.
2010 Mathematics Subject Classification: 49M15, 65K10
Full text: PDF
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