We propose a novel Trefftz method for the numerical solution of the direct problem as well as the Cauchy problem of the multi-dimensional Laplace equation in an arbitrary domain. In the multiple/scale/direction Trefftz method (MSDTM) the directions are hyper-spherical unit vectors given explicitly, and the scales are determined by the collocation points on the boundary which play a role of post-conditioner regularization of the resultant linear system to overcome the highly ill-posed behavior of the inverse Cauchy problem. The present paper can largely reduce the number of unknown coefficients appeared in the series expansion of numerical solution. Several three-dimensional numerical examples of direct problems, including a non-harmonic boundary value problem, and the inverse Cauchy problems in irregular domains are solved to demonstrate the efficiency and accuracy of the MSDTM, where the noises up to the levels 10-30% are imposed on the given data to test the robustness.

• 出版日期2018-3
• 单位河海大学