Journal ArticleDOI
Convergence analysis of the immersed interface method
Huaxiong Huang,Zhilin Li +1 more
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A rigorous error analysis is given for the immersed interface method (IIM) applied to elliptic problems with discontinuities and singularities, and second-order convergence of IIM is indicated by the analysis.Abstract:
A rigorous error analysis is given for the immersed interface method (IIM) applied to elliptic problems with discontinuities and singularities. The finite difference scheme using IIM is shown to satisfy the conditions of a maximum principle for a certain class of problems. Comparison functions are constructed to obtain error bounds for some of the approximate solutions. The asymptotic error expansion provides further useful insights and details of the behaviour and convergence properties of IIM, which leads to a sharper estimate of the error bound. Second-order convergence of IIM is indicated by the analysis. Numerical examples are also given to support the analytical results.read more
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New Cartesian grid methods for interface problems using the finite element formulation
Zhilin Li,Tao Lin,Xiao-Hui Wu +2 more
TL;DR: New finite element methods based on Cartesian triangulations are presented for two dimensional elliptic interface problems involving discontinuities in the coefficients, and these new methods can be used as finite difference methods.
Journal ArticleDOI
High order matched interface and boundary method for elliptic equations with discontinuous coefficients and singular sources
TL;DR: This paper introduces a novel high order interface scheme, the matched interface and boundary (MIB) method, for solving elliptic equations with discontinuous coefficients and singular sources on Cartesian grids by appropriate use of auxiliary line and/or fictitious points.
Journal ArticleDOI
A survey on level set methods for inverse problems and optimal design
Martin Burger,Stanley Osher +1 more
TL;DR: This paper provides a survey on the recent development in level set methods in inverse problems and optimal design, and provides a review on numerical methods important in this context, and gives an overview of applications treated withlevel set methods.
Journal ArticleDOI
The immersed interface method using a finite element formulation
Zhilin Li,Zhilin Li +1 more
TL;DR: In this paper, a finite element method is proposed for one dimensional interface problems involving discontinuities in the coefficients of the differential equations and the derivatives of the solutions, which is shown to be second order accurate in the infinity norm.
Journal ArticleDOI
Maximum Principle Preserving Schemes for Interface Problems with Discontinuous Coefficients
Zhilin Li,Kazufumi Ito +1 more
TL;DR: New finite difference methods using Cartesian grids are developed for elliptic interface problems with variable discontinuous coefficients, singular sources, and nonsmooth or even discontinuous solutions to satisfy the sign property of the discrete maximum principle using quadratic optimization techniques.
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