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Generalized Hyers-Ulam stability of n-dimensional wave equations in the L2-normopen access
- Authors
- Kang, Dongseung; Kim, Dojin; Kim, Hoewoon B.
- Issue Date
- Jan-2026
- Publisher
- De Gruyter Brill
- Keywords
- Hyers-Ulam stability; wave equation; <italic>L</italic>(2)-norm; Fourier transform
- Citation
- Demonstratio Mathematica, v.59, no.1, pp 1 - 11
- Pages
- 11
- Indexed
- SCIE
SCOPUS
- Journal Title
- Demonstratio Mathematica
- Volume
- 59
- Number
- 1
- Start Page
- 1
- End Page
- 11
- ISSN
- 0420-1213
2391-4661
- Abstract
- This research investigates the generalized Hyers-Ulam stability of the wave equation in an n-dimensional space, evaluated using the L 2-norm. Typically, the results of Hyers-Ulam stability problems for differential equations are established using either the supremum norm or L infinity-norm, with a focus on initial conditions or forcing terms to estimate error terms. In this study, we employ an integral approach utilizing the Fourier transform and Parseval's equality to derive the L 2-bound for the generalized Hyers-Ulam stability of the governing equation, specifically within the framework of the L 2-norm. Furthermore, to validate the analytical estimates, we conduct numerical experiments incorporating various types of control functions based on the obtained results.
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Collections - College of Natural Science > Department of Mathematics > 1. Journal Articles
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Related Researcher
- Kim, Do Jin
- College of Natural Science (Department of Mathematics)