REICH-TYPE CONTRACTIVE MAPPING INTO A COMPLETE METRIC SPACE AND CONTINUOUS, INJECTIVE AND SUBSEQUENTIALLY CONVERGENT MAPPING

  • Samoil Malcheski
Keywords: Mapping, metric space

Abstract

In this paper, is given a generalization of the fixed point theorem of the Reich-type mapping on a complete metric space . Continuous, injective and sub-sequentially convergent mapping  was used, as well as is taken that function  is from the class  continuous monotonically nondecreasing functions  such that , where it is additionally assumed that it is subadditive, i.e. , for each .

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Published
2023-12-10
How to Cite
Malcheski, S. (2023). REICH-TYPE CONTRACTIVE MAPPING INTO A COMPLETE METRIC SPACE AND CONTINUOUS, INJECTIVE AND SUBSEQUENTIALLY CONVERGENT MAPPING. Balkan Journal of Applied Mathematics and Informatics, 6(2), 63-66. Retrieved from https://js.ugd.edu.mk/index.php/bjami/article/view/5982
Issue
Vol. 6 No. 2 (2023): BJAMI
Section
Articles