On the uniqueness of best approximation in Orlicz spaces
Abstract
Keywords
- Orlicz Spaces
- best approximation
- characterization of best approximation operators
- uniqueness of best approximation operators
Supporting Institution
Project Number
References
- S. Acinas, S. Favier and R. Lorenzo: Extension of the Best Polynomial Operator in Generalized Orlicz Spaces, J. Approx. Theory, 310 (2025), Article ID: 106174.
- S. Acinas, S. Favier: Multivalued Extended Best $\Phi$−Polynomial Approximation Operator, Numer. Funct. Anal. Optim., 37 (11) (2016), 1339–1353.
- A. Benavente, S. Favier and F. Levis: Existence and characterization of best $\varphi$− approximations by linear subspaces, Adv. Pure Appl. Math., 8 (3) (2017), 209–217.
- E. W. Cheney, D. E. Wulbert: The existence and unicity of best approximations, Math. Scand., 24 (1969), 113–140.
- R. De Vore: One-sided approximation of functios, J. Approx. Theory, 1 (1968), 11–25.
- R. V. Galkin: The uniqueness of the element of best mean approximation to a continuous function using splines with fixed nodes, Math. Notes, 15 (1974), 3–8.
- D. Jackson: A general class of problems in Approximation, Amer. J. Math., 46 (1924), 215–234.
- W. M.Kozlowski: On Modular Approximants in Sequential Convergence Spaces, J. Approx. Theory, 264 (2021), Article ID: 105535.
Details
Primary Language
English
Subjects
Real and Complex Functions (Incl. Several Variables)
Journal Section
Research Article
Authors
Ana Benavente
This is me
0000-0003-2351-1746
Argentina
Juan Costa Ponce
This is me
0009-0000-9112-5500
Argentina
Sergio Favier
*
0000-0002-2395-7652
Argentina
Publication Date
June 16, 2026
Submission Date
February 15, 2026
Acceptance Date
June 7, 2026
Published in Issue
Year 2026 Volume: 9 Number: 2
