Computing the zeros of the Szegö kernel for doubly connected regions using conformal mapping
An explicit formula for the zero of the Szegö kernel for an annulus region is well-known. There exists a transformation formula for the Szegö kernel from a doubly connected region onto an annulus. Based on conformal mapping, we derive an analytical formula for the zeros of the Szegö kernel for a gen...
Main Authors: | Gafai, Nuraddeen S., Mohamed Murid, Ali Hassan, Naqos, Samir, A. Wahid, Nur H. A. |
---|---|
Format: | Article |
Language: | English |
Published: |
American Institute of Mathematical Sciences
2023
|
Subjects: | |
Online Access: | http://eprints.utm.my/104964/1/AliHassanMohamed2023_ComputingtheZerosoftheSzeg%C3%B6Uernel.pdf |
Similar Items
-
Computing the zeros of the Szegö kernel for doubly connected regions using conformal mapping
by: Nuraddeen S. Gafai, et al.
Published: (2023-03-01) -
Infinite product representation for the Szegö Kernel for an annulus
by: Gafai, Nuraddeen S., et al.
Published: (2022) -
An integral equation method for conformal mapping of doubly connected regions involving the neumann kernel
by: Murid, Ali Hassan Mohamed, et al.
Published: (2008) -
An integral equation method for conformal mapping of doubly connected regions involving the Kerzman-Stein kernel
by: Murid, Ali H. M., et al.
Published: (2007) -
Some integral equations for the Szego and the Bergman kernels.
by: Murid, Ali H.M., et al.
Published: (1995)