Conformal mapping of unbounded multiply connected regions onto logarithmic spiral slit with infinite straight slit
This paper presents a boundary integral equation method with the adjoint generalized Neumann kernel for conformal mapping of unbounded multiply connected regions. The canonical region is the entire complex plane bounded by an infinite straight slit on the line Im ω = 0 and finite logarithmic spiral...
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my.utm.668932017-07-26T04:25:23Z http://eprints.utm.my/id/eprint/66893/ Conformal mapping of unbounded multiply connected regions onto logarithmic spiral slit with infinite straight slit Mohamed Murid, Ali Hassan A.M. Yunus, Arif Q Science This paper presents a boundary integral equation method with the adjoint generalized Neumann kernel for conformal mapping of unbounded multiply connected regions. The canonical region is the entire complex plane bounded by an infinite straight slit on the line Im ω = 0 and finite logarithmic spiral slits. Some linear boundary integral equations are constructed from a boundary relationship satisfied by an analytic function on a multiply connected region. These integral equations are uniquely solvable. The kernel involved in these integral equations is the adjoint generalized Neumann kernel. USIM 2016-01-11 Conference or Workshop Item PeerReviewed Mohamed Murid, Ali Hassan and A.M. Yunus, Arif (2016) Conformal mapping of unbounded multiply connected regions onto logarithmic spiral slit with infinite straight slit. In: The 4th International Conference of Mathematical Sciences : Championing the Way in a Problem Based and Data Driven Society, ICMS 2016, 15-17 Nov, 2016, Putrajaya, Malaysia. http://dx.doi.org/10.1063/1.4980981 |
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Q Science Mohamed Murid, Ali Hassan A.M. Yunus, Arif Conformal mapping of unbounded multiply connected regions onto logarithmic spiral slit with infinite straight slit |
| description |
This paper presents a boundary integral equation method with the adjoint generalized Neumann kernel for conformal mapping of unbounded multiply connected regions. The canonical region is the entire complex plane bounded by an infinite straight slit on the line Im ω = 0 and finite logarithmic spiral slits. Some linear boundary integral equations are constructed from a boundary relationship satisfied by an analytic function on a multiply connected region. These integral equations are uniquely solvable. The kernel involved in these integral equations is the adjoint generalized Neumann kernel. |
| format |
Conference or Workshop Item |
| author |
Mohamed Murid, Ali Hassan A.M. Yunus, Arif |
| author_facet |
Mohamed Murid, Ali Hassan A.M. Yunus, Arif |
| author_sort |
Mohamed Murid, Ali Hassan |
| title |
Conformal mapping of unbounded multiply connected regions onto logarithmic spiral slit with infinite straight slit |
| title_short |
Conformal mapping of unbounded multiply connected regions onto logarithmic spiral slit with infinite straight slit |
| title_full |
Conformal mapping of unbounded multiply connected regions onto logarithmic spiral slit with infinite straight slit |
| title_fullStr |
Conformal mapping of unbounded multiply connected regions onto logarithmic spiral slit with infinite straight slit |
| title_full_unstemmed |
Conformal mapping of unbounded multiply connected regions onto logarithmic spiral slit with infinite straight slit |
| title_sort |
conformal mapping of unbounded multiply connected regions onto logarithmic spiral slit with infinite straight slit |
| publisher |
USIM |
| publishDate |
2016 |
| url |
http://eprints.utm.my/id/eprint/66893/ http://dx.doi.org/10.1063/1.4980981 |
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1643655856073474048 |