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Please use this identifier to cite or link to this item: http://ir.ncue.edu.tw/ir/handle/987654321/8945

Title: Critical Point Theorems and Ekeland Type Variational Principle with Applications
Authors: L. J. Lin;Sung Yu Wang;Q. H. Ansari
Contributors: 數學系
Keywords: variational relation problem � Stampacchia equilibrium problem
Date: 2011
Issue Date: 2011-05-10T06:51:52Z
Publisher: Hindawi
Abstract: We introduce the notion of  λ-spaces which is much weaker than cone metric spaces defined by Huang and X. Zhang (2007). We establish some critical point theorems in the setting of  λ-spaces and, in particular, in the setting of complete cone metric spaces. Our results generalize the critical point theorem proposed by Dancs et al. (1983) and the results given by Khanh and Quy (2010) to λ-spaces and cone metric spaces. As applications of our results, we characterize the completeness of  λ-space (cone metric spaces and quasimetric spaces are special cases of  λ-space) and studying the Ekeland type variational principle for single variable vector-valued functions as well as for multivalued bifunctions in the setting of cone metric spaces.
Relation: Fixed Point Theory and Applications, 2011:1-21
Appears in Collections:[數學系] 期刊論文

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