Computational Methods and Function Theory (CMFT 2013), Jun 10, 2013
In this talk, we shall present a fast boundary integral equation method for approximating the con... more In this talk, we shall present a fast boundary integral equation method for approximating the conformal mapping from multiply connected regions of finite connectivity onto Koebe's thirty nine canonical slit regions (see Koebe [1, Figures 1-39]) as well as the canonical region obtained by removing rectilinear slits from a strip (see Wen [2, p. 128]). The method is based on a combination of a uniquely solvable boundary integral equation with generalized Neumann kernel and the Fast Multipole Method. The presented method requires O ((m+ 1 ...
Computational Methods and Function Theory (CMFT 2013), Jun 10, 2013
In this talk, we shall present a fast boundary integral equation method for approximating the con... more In this talk, we shall present a fast boundary integral equation method for approximating the conformal mapping from multiply connected regions of finite connectivity onto Koebe's thirty nine canonical slit regions (see Koebe [1, Figures 1-39]) as well as the canonical region obtained by removing rectilinear slits from a strip (see Wen [2, p. 128]). The method is based on a combination of a uniquely solvable boundary integral equation with generalized Neumann kernel and the Fast Multipole Method. The presented method requires O ((m+ 1 ...
Uploads
Papers by Mohamed Nasser