Boyd-Wong type contractions in generalized parametric bipolar metric space

Manoj Kumar; Ozgur Ege; Vinit Mor; Pankaj Kumar; Manuel De la Sen

doi:10.1016/j.heliyon.2024.e23998

Boyd-Wong type contractions in generalized parametric bipolar metric space

Heliyon. 2024 Jan 10;10(2):e23998. doi: 10.1016/j.heliyon.2024.e23998. eCollection 2024 Jan 30.

Authors

Manoj Kumar¹, Ozgur Ege², Vinit Mor¹, Pankaj Kumar¹, Manuel De la Sen³

Affiliations

¹ Department of Mathematics, Baba Mastnath University, Asthal Bohar, Rohtak, 124021, Haryana, India.
² Department of Mathematics, Faculty of Science, Ege University, Bornova, Izmir, 35100, Turkey.
³ Institute of Research and Development of Processes, Department of Electricity and Electronics, University of the Basque Country, 48940 Leioa, Spain.

Abstract

In this manuscript, we introduce a new notion of generalized parametric bipolar metric space as a generalization of generalized parametric space and bipolar metric space. We also introduce Boyd-Wong type contractions for covariant and contravariant mappings to prove the fixed point results in the newly defined space. Some examples are also provided to illustrate the main results. Some corollaries are given of our results which shows the existence of fixed point for Banach type covariant and contravariant contractions. We solve integral and fractional differential equations with the help of proved results.

Keywords: Boyd-Wong type contractions; Contravariant mappings; Covariant mappings; Fixed point; Gpbms (generalized parametric bipolar metric space); primary, 47H10; secondary, 54H25.