角形域上Hermite三次样条多小波自然边界元法

为了解决应用自然边界元方法解角形区域上的调和方程Neumann边值问题中存在的奇异积分问题,采用保角映射,利用自然边界元Hermite三次样条多小波法.由于Hermite三次样条多小波基函数具备紧支集较短、稳定性良好和显式表达式简单,所以与自然边界元法相耦合,利用Galerkin-wavelet法去离散自然边界积分方程,使自然边界积分方程中的强奇异性减弱,从而将原问题的复杂性得以降低.算例表明:该方法切实可行.

Natural boundary element method with cubic Hermite spline multi-wavelet in angle domain

The Neumann boundary value problem of the Laplace equation in angle domain can be solved using natural boundary element method.In order to solve its singular integral,this study introduces the conformal mapping and proposes a natural boundary element method with cubic Hermite spline multi-wavelet.The cubic Hermite spline multi-wavelet has a shorter tight collection,better stability and good explicit expression.Thus it is coupled with the natural boundary element method.Accordingly,Galerkin-wavelet method is used to discretize the natural boundary integral equation and to make the strong singular integral of the natural boundary equations become a weak singular integral.Therefore,the problem is simplified.A numerical example shows that the method is feasible.