Open Journal of Mathematical Analysis
Vol. 7 (2023), Issue 1, pp. 56 – 70
ISSN: 2616-8111 (Online) 2616-8103 (Print)
DOI: 10.30538/psrp-oma2023.0123

Expansion of the Jensen \((\Gamma_{1},\Gamma_{2})\)-functional inequatities based on Jensen type \((\eta,\lambda)\)-functional equation with \(3k\)-Variables in complex Banach space

Ly Van An\(^{1}\)
\(^{1}\) Faculty of Mathematics Teacher Education, Tay Ninh University, Tay Ninh, Vietnam

Abstract

In this paper, we work on expanding the Jensen \((\Gamma_{1},\Gamma_{2})\)-function inequalities by relying on the general Jensen \((\eta,\lambda)\)-functional equation with \(3k\)-variables on the complex Banach space. That is the main result of this.

Keywords:

Generalized Jensen type \((\Gamma_{1},\Gamma_{2})\)-functional inequality; Generalized Jensen type \((\eta,\lambda)\)-functional equations; Hyers-Ulam-Rassias stability; complex Banach space; complex normed vector spaces.