Analysis of the Boundary Knot Method for 3D Helmholtz-Type Equation

Numerical solutions of the boundary knot method (BKM) always perform oscillatory convergence when using a large number of boundary points in solving the Helmholtz-type problems. The main reason for this phenomenon may contribute to the severely ill-conditioned full coefficient matrix. In order to obtain admissible stable convergence results, regularization techniques and the effective condition number are employed in the process of simulating 3D Helmholtz-type problems. Numerical results are tested for the 3D Helmholtz-type equation with noisy and non-noisy boundary conditions. It is shown that the BKM in combination with the regularization techniques is able to produce stable numerical solutions.

[1]  Fatemeh Ghasemi,et al.  The Galerkin boundary node method for magneto-hydrodynamic (MHD) equation , 2014, J. Comput. Phys..

[2]  F. Sun,et al.  AN INTERPOLATING BOUNDARY ELEMENT-FREE METHOD WITH NONSINGULAR WEIGHT FUNCTION FOR TWO-DIMENSIONAL POTENTIAL PROBLEMS , 2013 .

[3]  E. Ooi,et al.  A simplified approach for imposing the boundary conditions in the local boundary integral equation method , 2013 .

[4]  J. Zhang,et al.  Boundary Knot Method: An Overview and Some Novel Approaches , 2012 .

[5]  Leevan Ling,et al.  Combinations of the method of fundamental solutions for general inverse source identification problems , 2012, Appl. Math. Comput..

[6]  A. Shirzadi Meshless Local Integral Equations Formulation for the 2D Convection-Diffusion Equations with a Nonlocal Boundary Condition , 2012 .

[7]  F. Z. Wang Applicability of the Boundary Particle Method , 2011 .

[8]  Ji Lin,et al.  A new investigation into regularization techniques for the method of fundamental solutions , 2011, Math. Comput. Simul..

[9]  Xinrong Jiang,et al.  Investigation of regularized techniques for boundary knot method , 2010 .

[10]  Yijun Liu,et al.  A new boundary meshfree method with distributed sources , 2010 .

[11]  Jun-jie Zheng,et al.  The Hybrid Boundary Node Method Accelerated by Fast Multipole Expansion Technique for 3D Elasticity , 2010 .

[12]  Mark Zajac,et al.  The moving boundary node method: A level set-based, finite volume algorithm with applications to cell motility , 2010, J. Comput. Phys..

[13]  Wen Chen,et al.  A method of fundamental solutions without fictitious boundary , 2010 .

[14]  Wu Zhang,et al.  An interpolating boundary element-free method (IBEFM) for elasticity problems , 2010 .

[15]  Božidar Šarler,et al.  Solution of potential flow problems by the modified method of fundamental solutions: Formulations with the single layer and the double layer fundamental solutions , 2009 .

[16]  Leevan Ling,et al.  Effective Condition Number for Boundary Knot Method , 2009 .

[17]  Leevan Ling,et al.  Applicability of the method of fundamental solutions , 2009 .

[18]  Chein-Shan Liu,et al.  A modified collocation Trefftz method for the inverse Cauchy problem of Laplace equation , 2008 .

[19]  Zi-Cai Li,et al.  Effective condition number for simplified hybrid Trefftz methods , 2008 .

[20]  Jeng-Tzong Chen,et al.  A Modified Method of Fundamental Solutions with Source on the Boundary for Solving Laplace Equations with Circular and Arbitrary Domains , 2007 .

[21]  Y. Hon,et al.  Method of fundamental solutions with regularization techniques for Cauchy problems of elliptic operators , 2007 .

[22]  Hokwon A. Cho,et al.  Some comments on the ill-conditioning of the method of fundamental solutions , 2006 .

[23]  Cheng Yu-min,et al.  Boundary element-free method for elastodynamics , 2005 .

[24]  K. M. Liew,et al.  Boundary element‐free method (BEFM) for two‐dimensional elastodynamic analysis using Laplace transform , 2005 .

[25]  D. L. Young,et al.  Novel meshless method for solving the potential problems with arbitrary domain , 2005 .

[26]  Bangti Jin,et al.  Boundary knot method for the Cauchy problem associated with the inhomogeneous Helmholtz equation , 2005 .

[27]  Bangti Jin,et al.  Boundary knot method for some inverse problems associated with the Helmholtz equation , 2005 .

[28]  Y. Hon,et al.  The method of fundamental solution for solving multidimensional inverse heat conduction problems , 2005 .

[29]  Vladimir Sladek,et al.  Transient heat conduction analysis in functionally graded materials by the meshless local boundary integral equation method , 2003 .

[30]  P. Ramachandran Method of fundamental solutions: singular value decomposition analysis , 2002 .

[31]  K. H. Chen,et al.  The Boundary Collocation Method with Meshless Concept for Acoustic Eigenanalysis of Two-Dimensional Cavities Using Radial Basis Function , 2002 .

[32]  Jianming Zhang,et al.  A hybrid boundary node method , 2002 .

[33]  W. Chen,et al.  A meshless, integration-free, and boundary-only RBF technique , 2002, ArXiv.

[34]  S. Mukherjee,et al.  The boundary node method for three-dimensional problems in potential theory , 2000 .

[35]  Ilse C. F. Ipsen,et al.  The Lack of Influence of the Right-Hand Side on the Accuracy of Linear System Solution , 1998, SIAM J. Sci. Comput..

[36]  Graeme Fairweather,et al.  The method of fundamental solutions for elliptic boundary value problems , 1998, Adv. Comput. Math..

[37]  S. Atluri,et al.  A local boundary integral equation (LBIE) method in computational mechanics, and a meshless discretization approach , 1998 .

[38]  S. Mukherjee,et al.  THE BOUNDARY NODE METHOD FOR POTENTIAL PROBLEMS , 1997 .

[39]  P. Hansen,et al.  The effective condition number applied to error analysis of certain boundary collocation methods , 1994 .

[40]  Per Christian Hansen,et al.  REGULARIZATION TOOLS: A Matlab package for analysis and solution of discrete ill-posed problems , 1994, Numerical Algorithms.

[41]  Per Christian Hansen,et al.  Analysis of Discrete Ill-Posed Problems by Means of the L-Curve , 1992, SIAM Rev..

[42]  T. Chan,et al.  Effectively Well-Conditioned Linear Systems , 1988 .

[43]  Hongping Zhu,et al.  Thermal analysis of 3D composites by a new fast multipole hybrid boundary node method , 2014 .

[44]  Yumin Cheng,et al.  A boundary element-free method (BEFM) for two-dimensional potential problems , 2009 .