High-order accurate methods for Nyström discretization of integral equations on smooth curves in the plane S Hao, AH Barnett, PG Martinsson, P Young Advances in Computational Mathematics 40, 245-272, 2014 | 112 | 2014 |
A high-order Nyström discretization scheme for boundary integral equations defined on rotationally symmetric surfaces P Young, S Hao, PG Martinsson Journal of Computational Physics 231 (11), 4142-4159, 2012 | 43 | 2012 |
A direct solver for elliptic PDEs in three dimensions based on hierarchical merging of Poincaré–Steklov operators S Hao, PG Martinsson Journal of Computational and Applied Mathematics 308, 419-434, 2016 | 28 | 2016 |
A simplified technique for the efficient and highly accurate discretization of boundary integral equations in 2D on domains with corners A Gillman, S Hao, PG Martinsson Journal of Computational Physics 256, 214-219, 2014 | 20 | 2014 |
An efficient and highly accurate solver for multi-body acoustic scattering problems involving rotationally symmetric scatterers S Hao, PG Martinsson, P Young Computers & Mathematics with Applications 69 (4), 304-318, 2015 | 18 | 2015 |
An accelerated Poisson solver based on multidomain spectral discretization T Babb, A Gillman, S Hao, PG Martinsson BIT Numerical Mathematics 58, 851-879, 2018 | 15 | 2018 |
High-order accurate Nystrom discretization of integral equations with weakly singular kernels on smooth curves in the plane S Hao, AH Barnett, PG Martinsson, P Young arXiv preprint arXiv:1112.6262, 2011 | 9 | 2011 |
High-order accurate Nystrom discretization of integral equations with weakly singular kernels on smooth curves in the plane S Hao, AH Barnett, PG Martinsson, P Young arXiv preprint arXiv:1112.6262, 2011 | 9 | 2011 |
Numerical methods for solving linear elliptic PDEs: Direct solvers and high order accurate discretizations S Hao University of Colorado, 2015 | | 2015 |
A11 A12 A21 A22 A Gillman, S Hao, PG Martinsson | | |