映射族的不动点和等价表征

Pub Date : 2023-01-01 DOI:10.2298/fil2305391p
Abhijit Pant, R. Pant, M. Joshi, V. Rakočević
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引用次数: 0

摘要

本文证明了完全度量空间或完全b-度量空间的单参数压缩自映射族的一个不动点定理,该族的每一个成员都有一个唯一不动点,该不动点也是该族的唯一公共不动点;映射在不动点上可以是连续的,也可以是不连续的。我们还证明了在较弱的连续性形式的假设下,满足我们所采用的压缩条件的映射的不动点性质暗示了下空间的完备性。我们得到的完备性的表征不仅包含Subrahmanyam?S定理将完备性的表征作为一种特殊情况,并将其推广到b-度量空间。在不动点处具有不连续的收缩映射的结果已经在具有不连续激活函数的神经网络中得到了应用(例如Ozgur和Tas[19,20])。
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Fixed points of a family of mappings and equivalent characterizations
In the present paper we prove a fixed point theorem for a one parameter family of contractive self-mappings, of a complete metric space or a complete b-metric space, each member of which has a unique fixed point that is also the unique common fixed point of the family; the mappings may be continuous or discontinuous at the fixed point. We also prove that under the assumption of a weaker form of continuity the fixed point property for mappings satisfying the contractive conditions employed by us implies completeness of the underlying space. The characterization of completeness obtained by us not only contains Subrahmanyam?s theorem on characterization of completeness as a particular case but also extends it to b-metric spaces. Results on contractive mappings with discontinuity at the fixed point have found applications in neural networks with discontinuous activation function (e.g. Ozgur and Tas [19, 20]).
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