Symmetric Quadratic Energy and Hyers-Ulam Stability in Extended $b$-Metric Spaces: Symmetric Quadratic Energy and Hyers-Ulam Stability

S. Karthikeyan; M. Arunkumar; S. Gayathri; A. Ramachandran; K. Tamilvanan

doi:10.5269/bspm.81591

Symmetric Quadratic Energy and Hyers-Ulam Stability in Extended $b$-Metric Spaces

Symmetric Quadratic Energy and Hyers-Ulam Stability

Autores

S. Karthikeyan R.M.K. Engineering College
M. Arunkumar Kalaignar Karunanidhi Government Arts College
S. Gayathri Vinayaka Mission’s Research Foundation (DU)
A. Ramachandran Dhanalakshmi College of Engineering
K. Tamilvanan R.M.K. Engineering College

DOI:

https://doi.org/10.5269/bspm.81591

Resumo

This paper examines the Hyers--Ulam stability of a quadratic functional equation arising naturally in nonlinear analysis and energy modeling.
By employing both the classical direct method and a fixed point approach, we establish stability results within the framework of extended
$b$-metric spaces. The fixed point method provides a unified technique for proving the existence and uniqueness of an exact quadratic mapping
approximating any function that satisfies the associated inequality. Furthermore, we present an application to a quadratic energy model to
demonstrate the effectiveness of the proposed stability analysis. The results obtained extend and generalize several known stability theorems
for quadratic functional equations in various metric structures.