FIXED POINTS FOR WEAKLY INWARD MAPPINGS IN BANACH SPACES (II)

S. Hu and Y. Sun[1] defined the fixed point index for weakly inward mappings, investigated its properties and studied fixed points for such mappings. In this paper, following S. Hu and Y. Sun, we further investigate boundary conditions, under which the fixed point index for i(A, Ω, p) is equal to no...

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Bibliographic Details
Published in:Analysis in theory & applications 2010, Vol.26 (4), p.308-319
Main Author: Shaoyuan Xu Wangbin Xu Guanghui Zhou
Format: Article
Language:Chinese
Subjects:
Banach空间
Sun公司
不动点定理
不动点指数
固定点
映射
胡锦涛
边界条件
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Summary:S. Hu and Y. Sun[1] defined the fixed point index for weakly inward mappings, investigated its properties and studied fixed points for such mappings. In this paper, following S. Hu and Y. Sun, we further investigate boundary conditions, under which the fixed point index for i(A, Ω, p) is equal to nonzero, where i(A, Ω, p) is the completely continuous and weakly inward mapping. Correspondingly, we can obtain many new fixed point theorems of the completely continuous and weakly inward mapping, which generalize some famous theorems such as Rothe's theorem, Altman's theorem, Petryshyn's theorem etc. in the case of weakly inward mappings. In addition, our conclusions extend the famous fixed point theorem of cone expansion and compression to the case of weakly inward mappings. Moreover, the main results contain and generalize the corresponding results in the recent work[2].
ISSN:1672-4070
1573-8175