NUMERICAL METHOD FOR NON LOCAL PROBLEM

Authors

  • A CHENIGUEL Kasdi Merbah University, Ouargla
  • A AYADI Larbi Ben M’hidi University, Oum El Bouaghi

Keywords:

Finite Difference Schemes, High-order Compact Schemes, Non local problem, Order of accuracy, Numerical methods for partial differential equations

Abstract

This paper is concerned with a high-order finite difference scheme for a non
local boundary value problem of parabolic equation the integral in the boundary equation is approximated by the Simpson rule numerical experiments show that the approximate solution coincides with the exact one at more than fifty percent grid points discretization.

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Author Biographies

A CHENIGUEL, Kasdi Merbah University, Ouargla

Departement of Mathematics and Computer Sciences
Faculty of Sciences

A AYADI, Larbi Ben M’hidi University, Oum El Bouaghi

Departement of mathematics and computer sciences
Faculty of sciences

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Published

2009-12-01

How to Cite

CHENIGUEL, A., & AYADI, A. (2009). NUMERICAL METHOD FOR NON LOCAL PROBLEM. Sciences & Technology. A, Exactes Sciences, (30), 15–18. Retrieved from https://revue.umc.edu.dz/a/article/view/25

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