The On Best Multiplier Approximation of K-Monotone Unbounded Functions by Spline Polynomials in L_(P,λ_n )-Space

Authors

  • Hasan Maktoof Department of Mathematics, College of Science,Mustansiriyah University Baghdad, Iraq https://orcid.org/0000-0002-6759-0629
  • Saheb K. Al-Saidy College of Engineering Uruk University
  • Abdul khaleq owaid mazeel College of Science Mustansiriyah University

DOI:

https://doi.org/10.31642/JoKMC/2018/100212

Keywords:

Multiplier Integral, Multiplier Averaged Modulus of Smoothness, Multiplier Norm, Spline Polynomial

Abstract

The main purpose of this research is to study the degree of the best multiplier approximation of monotone unbounded functions in space, where  by spline polynomials in terms of averaged multiplier modulus smoothness  using some definitions and theorems necessary for this.

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References

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Published

2023-08-31

How to Cite

Maktoof, H., Al-Saidy, S. K., & mazeel, A. khaleq owaid. (2023). The On Best Multiplier Approximation of K-Monotone Unbounded Functions by Spline Polynomials in L_(P,λ_n )-Space . Journal of Kufa for Mathematics and Computer, 10(2), 76–79. https://doi.org/10.31642/JoKMC/2018/100212