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Matematicheskie Zametki, 2021, Volume 109, Issue 2, paper published in the English version journal
(Mi mzm13022)
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Papers published in the English version of the journal
Stability Property of Functional Equations inModular Spaces: A Fixed-Point Approach
P. Sahaa, Pratap Mondalb, B. S. Choudhurya a Indian Institute of Engineering Science
and Technology, Shibpur,
Howrah, 711103 India
b Bijoy Krishna Girls' College, Howrah, Howrah, 711101 India
Abstract:
We investigate the Hyers–Ulam–Rassias stability property of a quadratic
functional equation. The analysis is done in the context of modular spaces. The type of
stability considered here is very general in character which has been considered in
various domains of mathematics. The speciality of the functional equation considered here
is that it has a geometrical background behind its introduction. We approach the problem
by applying a fixed point method for which a version of the contraction mapping principle
in modular spaces is utilized. Also the results in this paper are established without
using some familiar conditions on modular spaces.
Keywords:
Hyers–Ulam–Rassias stability, quadratic functional equation, modular spaces, fixed
point.
Received: 01.05.2020
Citation:
P. Saha, Pratap Mondal, B. S. Choudhury, “Stability Property of Functional Equations inModular Spaces: A Fixed-Point Approach”, Math. Notes, 109:2 (2021), 262–269
Linking options:
https://www.mathnet.ru/eng/mzm13022
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Abstract page: | 114 |
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