On Solution of Optimization Function Generated by Using Laplace Equation

Asaad Naser Hussein Mzedawee

On Solution of Optimization Function Generated by Using Laplace Equation

Authors

Asaad Naser Hussein Mzedawee University of Al-Qadisiyah – College of Administration & Economics, Iraq

Keywords:

interpolation, spline, Chebyshev’s polynomials

Abstract

The Laplace equation generates in each such space the equation of minimizing the residual functional. The existence and uniqueness of optimal splines are proved. For their coefficients and residuals, exact formulas are obtained. It is shown that with increasing N, the minimum of the residual functional is ( ) −5 O N , and the special sequence consisting of optimal splines is fundamental

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Published

2022-12-24

Issue

Vol. 13 (2022): EJPCM

Section

Articles

License

This work is licensed under a Creative Commons Attribution-NonCommercial-NoDerivatives 4.0 International License.

How to Cite

On Solution of Optimization Function Generated by Using Laplace Equation. (2022). Eurasian Journal of Physics,Chemistry and Mathematics, 13, 102-106. https://geniusjournals.org/index.php/ejpcm/article/view/4972