Ulam–Hyers stability of hexadecic functional equations in multi-Banach spaces
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Murali Ramdoss
and
Antony Raj Ardulass
Abstract
In this paper, we compute the general solution and determine the Ulam–Hyers stability for a new form of hexadecic functional equations in multi-Banach spaces.
References
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© 2017 Walter de Gruyter GmbH, Berlin/Boston
Articles in the same Issue
- Frontmatter
- s-convex functions on discrete time domains
- Ulam–Hyers stability of hexadecic functional equations in multi-Banach spaces
- Existence of variational solutions for time dependent integrands via minimizing movements
- Enclosure theorems and barrier principles for energy stationary currents and the associated Brakke-flow
-
Remarks on
Articles in the same Issue
- Frontmatter
- s-convex functions on discrete time domains
- Ulam–Hyers stability of hexadecic functional equations in multi-Banach spaces
- Existence of variational solutions for time dependent integrands via minimizing movements
- Enclosure theorems and barrier principles for energy stationary currents and the associated Brakke-flow
-
Remarks on
