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Details for article 17 of 68 found articles
| Title: |
Fifth-order numerical methods for heat equation subject to a boundary integral specification |
| Author: |
M. A. Rehman M. S. A. Taj M. M. Butt |
| Appeared in: |
Acta mathematica Universitatis Comenianae |
| Paging: | Volume LXXIX (2010) nr. 1 pages 89-104 |
| Year: |
2010 |
| Contents: |
In this paper a fifth-order numerical scheme is developed and implemented for the solution of homogeneous heat equation ut = <FONT SIZE='3' FACE='Symbol'>a</FONT> uxx with nonlocal boundary condition as well as for inhomogeneous heat equation ut = <FONT SIZE='3' FACE='Symbol'>a</FONT> uxx + s(x,t) with nonlocal boundary condition. The results obtained show that the numerical method based on the proposed technique is fifth-order accurate as well as L-acceptable. In the development of this method second-order spatial derivative are approximated by fifth-order finite-difference approximations which give a system of first order,linear, ordinary differential equations whose solution satisfies a recurrence relation which leads to the development of algorithm. The algorithm is tested on various heat equations and no oscillations are observed in the experiments. This method is based on partial fraction technique which is useful in parrel processing and it does not require complex arithmetic. |
| Publisher: |
Acta Mathematica Universitatis Comenianae (provided by DOAJ) |
| Source file: |
Elektronische Wetenschappelijke Tijdschriften |
Details for article 17 of 68 found articles
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