摘要
This paper presents a fourth-order Cartesian grid based boundary integral method(BIM)for heterogeneous interface problems in two and three dimensional space,where the problem interfaces are irregular and can be explicitly given by parametric curves or implicitly defined by level set functions.The method reformulates the governing equation with interface conditions into boundary integral equations(BIEs)and reinterprets the involved integrals as solutions to some simple interface problems in an extended regular region.Solution of the simple equivalent interface problems for integral evaluation relies on a fourth-order finite difference method with an FFT-based fast elliptic solver.The structure of the coefficient matrix is preserved even with the existence of the interface.In the whole calculation process,analytical expressions of Green’s functions are never determined,formulated or computed.This is the novelty of the proposed kernel-free boundary integral(KFBI)method.Numerical experiments in both two and three dimensions are shown to demonstrate the algorithm efficiency and solution accuracy even for problems with a large diffusion coefficient ratio.
基金
the National Natural Science Foundation of China(Grant No.DMS-12101553,Grant No.DMS-11771290)
the Natural Science Foundation of Zhejiang Province(Grant No.LQ22A010017)
the National Key Research and Development Program of China(Project No.2020YFA0712000)
the Science Challenge Project of China(Grant No.TZ2016002)
the Strategic Priority Research Program of Chinese Academy of Sciences(Grant No.XDA25000400)
the National Science Foundation of America(Grant No.ECCS-1927432)
also partially supported by the National Science Foundation of America(Grant No.DMS-1720420).
