In this paper, we report our recent advances on vertex centered finite volume element methods (FVEMs) for second order partial differential equations (PDEs). We begin with a brief review on linear and quadratic fi...In this paper, we report our recent advances on vertex centered finite volume element methods (FVEMs) for second order partial differential equations (PDEs). We begin with a brief review on linear and quadratic finite volume schemes. Then we present our recent advances on finite volume schemes of arbitrary order. For each scheme, we first explain its construction and then perform its error analysis under both HI and L2 norms along with study of superconvergence properties.展开更多
A nonconforming rectangular finite element method is proposed to solve a fluid structure interaction problem characterized by the Darcy-Stokes-Brinkman Equation with discontinuous coefficients across the interface of ...A nonconforming rectangular finite element method is proposed to solve a fluid structure interaction problem characterized by the Darcy-Stokes-Brinkman Equation with discontinuous coefficients across the interface of different structures.A uniformly stable mixed finite element together with Nitsche-type matching condi-tions that automatically adapt to the coupling of different sub-problem combinations are utilized in the discrete algorithm.Compared with other finite element methods in the literature,the new method has some distinguished advantages and features.The Boland-Nicolaides trick is used in proving the inf-sup condition for the multi-domain discrete problem.Optimal error estimates are derived for the coupled prob-lem by analyzing the approximation errors and the consistency errors.Numerical examples are also provided to confirm the theoretical results.展开更多
基金supported by National Science Foundation of USA(Grant No.DMS1115530)National Natural Science Foundation of China(Grant No.11171359)the Fundamental Research Funds for the Central Universities of China
文摘In this paper, we report our recent advances on vertex centered finite volume element methods (FVEMs) for second order partial differential equations (PDEs). We begin with a brief review on linear and quadratic finite volume schemes. Then we present our recent advances on finite volume schemes of arbitrary order. For each scheme, we first explain its construction and then perform its error analysis under both HI and L2 norms along with study of superconvergence properties.
基金supported by the US NSF grant DMS-1522768,CNFS grants.11371199,11471166.
文摘A nonconforming rectangular finite element method is proposed to solve a fluid structure interaction problem characterized by the Darcy-Stokes-Brinkman Equation with discontinuous coefficients across the interface of different structures.A uniformly stable mixed finite element together with Nitsche-type matching condi-tions that automatically adapt to the coupling of different sub-problem combinations are utilized in the discrete algorithm.Compared with other finite element methods in the literature,the new method has some distinguished advantages and features.The Boland-Nicolaides trick is used in proving the inf-sup condition for the multi-domain discrete problem.Optimal error estimates are derived for the coupled prob-lem by analyzing the approximation errors and the consistency errors.Numerical examples are also provided to confirm the theoretical results.
