Some new fixed point results in rectangular metric spaces with an application to fractional-order functional differential equations

Lokesh Budhia; Hassen Aydi; Arslan Hojat Ansari; Dhananjay Gopal

doi:10.15388/namc.2020.25.17928

Nonlinear Analysis (Jul 2020)

Some new fixed point results in rectangular metric spaces with an application to fractional-order functional differential equations

Lokesh Budhia,
Hassen Aydi,
Arslan Hojat Ansari,
Dhananjay Gopal

Affiliations

Lokesh Budhia: Sardal Vallabhbhai National Institute of Technology
Hassen Aydi: Ton Duc Thang University
Arslan Hojat Ansari: Islamic Azad University
Dhananjay Gopal: Sardal Vallabhbhai National Institute of Technology

DOI: https://doi.org/10.15388/namc.2020.25.17928
Journal volume & issue: Vol. 25, no. 4

Abstract

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In this paper, we establish some new fixed point theorems for generalized ϕ–ψ-contractive mappings satisfying an admissibility-type condition in a Hausdorff rectangular metric space with the help of C-functions. In this process, we rectify the proof of Theorem 3.2 due to Budhia et al. [New fixed point results in rectangular metric space and application to fractional calculus, Tbil. Math. J., 10(1):91–104, 2017]. Some examples are given to illustrate the theorems. Finally, we apply our result (Corollary 3.6) to establish the existence of a solution for an initial value problem of a fractional-order functional differential equation with infinite delay.

Published in Nonlinear Analysis

ISSN: 1392-5113 (Print); 2335-8963 (Online)
Publisher: Vilnius University Press
Country of publisher: Lithuania
LCC subjects: Science: Mathematics: Analysis
Website: http://www.journals.vu.lt/nonlinear-analysis

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