A Low Memory Solver for Integral Equations of Chandrasekhar Type in the Radiative Transfer Problems
The problems of radiative transfer give rise to interesting integral equations that must be faced with efficient numerical solver. Very often the integral equations are discretized to large-scale nonlinear equations and solved by Newton's-like methods. Generally, these kind of methods require t...
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Hindawi Limited
2011-01-01
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| Series: | Mathematical Problems in Engineering |
| Online Access: | http://dx.doi.org/10.1155/2011/467017 |
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doaj-dcfa19813a384b098de0b7acd20c62a02020-11-24T23:13:40ZengHindawi LimitedMathematical Problems in Engineering1024-123X1563-51472011-01-01201110.1155/2011/467017467017A Low Memory Solver for Integral Equations of Chandrasekhar Type in the Radiative Transfer ProblemsMohammed Yusuf Waziri0Wah June Leong1Malik Abu Hassan2Mansor Monsi3Department of Mathematics, Faculty of Science, Universiti Putra Malaysia, 43400 Serdang, MalaysiaDepartment of Mathematics, Faculty of Science, Universiti Putra Malaysia, 43400 Serdang, MalaysiaDepartment of Mathematics, Faculty of Science, Universiti Putra Malaysia, 43400 Serdang, MalaysiaDepartment of Mathematics, Faculty of Science, Universiti Putra Malaysia, 43400 Serdang, MalaysiaThe problems of radiative transfer give rise to interesting integral equations that must be faced with efficient numerical solver. Very often the integral equations are discretized to large-scale nonlinear equations and solved by Newton's-like methods. Generally, these kind of methods require the computation and storage of the Jacobian matrix or its approximation. In this paper, we present a new approach that was based on approximating the Jacobian inverse into a diagonal matrix by means of variational technique. Numerical results on well-known benchmarks integral equations involved in the radiative transfer authenticate the reliability and efficiency of the approach. The fact that the proposed method can solve the integral equations without function derivative and matrix storage can be considered as a clear advantage over some other variants of Newton's method.http://dx.doi.org/10.1155/2011/467017 |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
Mohammed Yusuf Waziri Wah June Leong Malik Abu Hassan Mansor Monsi |
| spellingShingle |
Mohammed Yusuf Waziri Wah June Leong Malik Abu Hassan Mansor Monsi A Low Memory Solver for Integral Equations of Chandrasekhar Type in the Radiative Transfer Problems Mathematical Problems in Engineering |
| author_facet |
Mohammed Yusuf Waziri Wah June Leong Malik Abu Hassan Mansor Monsi |
| author_sort |
Mohammed Yusuf Waziri |
| title |
A Low Memory Solver for Integral Equations of Chandrasekhar Type in the Radiative Transfer Problems |
| title_short |
A Low Memory Solver for Integral Equations of Chandrasekhar Type in the Radiative Transfer Problems |
| title_full |
A Low Memory Solver for Integral Equations of Chandrasekhar Type in the Radiative Transfer Problems |
| title_fullStr |
A Low Memory Solver for Integral Equations of Chandrasekhar Type in the Radiative Transfer Problems |
| title_full_unstemmed |
A Low Memory Solver for Integral Equations of Chandrasekhar Type in the Radiative Transfer Problems |
| title_sort |
low memory solver for integral equations of chandrasekhar type in the radiative transfer problems |
| publisher |
Hindawi Limited |
| series |
Mathematical Problems in Engineering |
| issn |
1024-123X 1563-5147 |
| publishDate |
2011-01-01 |
| description |
The problems of radiative transfer give rise to interesting integral equations
that must be faced with efficient numerical solver. Very often the integral equations are discretized to large-scale nonlinear equations and solved by Newton's-like methods. Generally, these kind of methods require the computation and storage
of the Jacobian matrix or its approximation. In this paper, we present a new approach that was based on approximating the Jacobian inverse into a diagonal matrix by means of variational technique. Numerical results on well-known benchmarks integral equations involved in the radiative transfer authenticate the reliability and efficiency of the approach. The fact that the proposed method can solve the integral equations without function derivative and matrix storage can be considered as a clear advantage over some other variants of Newton's method. |
| url |
http://dx.doi.org/10.1155/2011/467017 |
| work_keys_str_mv |
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