The Riemann–Hilbert problem and the generalized Neumann kernel R Wegmann, AHM Murid, MMS Nasser Journal of Computational and Applied Mathematics 182 (2), 388-415, 2005 | 62 | 2005 |
Boundary integral equations with the generalized Neumann kernel for Laplace’s equation in multiply connected regions MMS Nasser, AHM Murid, M Ismail, EMA Alejaily Applied Mathematics and Computation 217 (9), 4710-4727, 2011 | 57 | 2011 |
Linear integral equations for conformal mapping of bounded multiply connected regions onto a disk with circular slits AWK Sangawi, AHM Murid, MMS Nasser Applied Mathematics and Computation 218 (5), 2055-2068, 2011 | 36 | 2011 |
A boundary integral method for the Riemann–Hilbert problem in domains with corners MMS Nasser, AHM Murid, Z Zamzamir Complex Variables and Elliptic Equations 53 (11), 989-1008, 2008 | 33 | 2008 |
Eigenproblem of the generalized Neumann kernel AHM Murid, MMS Nasser Bull. Malaysia. Math. Sci. Soc.(second series) 26, 13-33, 2003 | 33 | 2003 |
An integral equation method for conformal mapping of doubly connected regions AHM Murid, MRM Razali Matematika, 79–93-79–93, 1999 | 30 | 1999 |
Annulus with circular slit map of bounded multiply connected regions via integral equation method WK Sangawi, HM Murid, MS Nasser Bulletin of the Malaysian Mathematical Sciences Society 35 (4), 2012 | 23 | 2012 |
Numerical conformal mapping via the Bergman kernel MRM Razali, MZ Nashed, AHM Murid Journal of computational and applied mathematics 82 (1-2), 333-350, 1997 | 21 | 1997 |
Numerical conformal mapping and its inverse of unbounded multiply connected regions onto logarithmic spiral slit regions and straight slit regions AAM Yunus, AHM Murid, MMS Nasser Proceedings of the Royal Society A: Mathematical, Physical and Engineering …, 2014 | 19 | 2014 |
Numerical conformal mapping of bounded multiply connected regions by an integral equation method AHM Murid, LN Hu Int. J. Contemp. Math. Sci 4 (23), 1121-1147, 2009 | 19 | 2009 |
Numerical experiment on conformal mapping of doubly connected regions onto a disk with a slit AHM Murid, LN Hu International Journal of Pure and Applied Mathematics 51 (4), 589-608, 2009 | 18 | 2009 |
Numerical evaluation of conformal mapping and its inverse for unbounded multiply connected regions AAM Yunus, AHM Murid, MMS Nasser Bull. Malays. Math. Sci. Soc 1 (24), 1-24, 2014 | 15 | 2014 |
A fast computational method for potential flows in multiply connected coastal domains MMS Nasser, T Sakajo, AHM Murid, LK Wei Japan Journal of Industrial and Applied Mathematics 32, 205-236, 2015 | 14 | 2015 |
Parallel slits map of bounded multiply connected regions AWK Sangawi, AHM Murid, MMS Nasser Journal of Mathematical Analysis and Applications 389 (2), 1280-1290, 2012 | 14 | 2012 |
Numerical conformal mapping via a boundary integral equation with the adjoint generalized Neumann kernel M Nasser, AHM Murid, AWK Sangawi arXiv preprint arXiv:1308.3929, 2013 | 13 | 2013 |
Circular slits map of bounded multiply connected regions AWK Sangawi, AHM Murid, MMS Nasser Abstract and Applied Analysis 2012, 2012 | 13 | 2012 |
Solving Riemann problem using Fredholm integral equation of the second kind AHM Murid, MRM Razali, MMS Nasser Proceeding of Simposium Kebangsaan Sains Matematik Ke 10, 172-179, 2002 | 13 | 2002 |
Numerical conformal mapping for exterior regions via the Kerzman-Stein kernel AHM Murid, MZ Nashed, MRM Razali The Journal of Integral Equations and Applications, 517-532, 1998 | 11 | 1998 |
Radial slit maps of bounded multiply connected regions AWK Sangawi, AHM Murid, MMS Nasser Journal of Scientific Computing 55, 309-326, 2013 | 10 | 2013 |
Numerical conformal mapping of doubly connected regions via the Kerzman-Stein kernel AHM Murid, NA Mohamed International Journal of Pure and Applied Mathematics 36 (2), 229, 2007 | 10 | 2007 |