Resolving elliptic boundary value problem and integral equation in relational partial metric space

Meena Joshi; Anita Tomar; Mohammad Sajid; S K Padaliya

doi:10.1016/j.heliyon.2024.e40766

Resolving elliptic boundary value problem and integral equation in relational partial metric space

Heliyon. 2024 Nov 29;10(23):e40766. doi: 10.1016/j.heliyon.2024.e40766. eCollection 2024 Dec 15.

Authors

Meena Joshi¹, Anita Tomar², Mohammad Sajid³, S K Padaliya⁴

Affiliations

¹ L. S. M. Campus, Pithoragarh-262501, Soban Singh Jeena Uttarakhand University, India.
² Pt. L. M. S. Campus, Sridev Suman Uttarakhand University, Rishikesh-249201, India.
³ Department of Mechanical Engineering, College of Engineering, Qassim University, Saudi Arabia.
⁴ S.G.R.R. (P.G.) College Dehradun-248001, India.

Abstract

In the present study, a novel version of the contraction theory on a relational partial metric space associated with a binary relation is exhibited. In this process, we observe that numerous relations can be used in many well-known fixed point theorems earlier introduced by multiple authors. We solve an elliptic boundary value problem and an integral equation to make the significance of the main conclusion evident. Exploring a nonlinear system, governed by nonlinear equations, underscores the importance of comprehending fixed points - pivotal states where the dynamics of a system remain unaltered.

Keywords: 47H09; 47H10; 54H25; Elliptic boundary value problem; Fixed point theorem; Nonlinear equations; Nonlinear system; Partial metric space.