An Adaptive Nonsymmetric Finite Volume and Boundary Element Coupling Method for a Fluid Mechanics Interface Problem
DOI10.1137/16M1076721zbMath1365.65237arXiv1605.07031OpenAlexW2963846443MaRDI QIDQ5738176
Christoph Erath, Robert Schorr
Publication date: 31 May 2017
Published in: SIAM Journal on Scientific Computing (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1605.07031
robustnessfinite volume methodboundary element methodadaptive mesh refinementa posteriori error estimatesLaplace problemelliptic transport equationconvection dominatednonsymmetric coupling
Finite volume methods applied to problems in fluid mechanics (76M12) Error bounds for boundary value problems involving PDEs (65N15) Boundary element methods applied to problems in fluid mechanics (76M15) Mesh generation, refinement, and adaptive methods for boundary value problems involving PDEs (65N50) Boundary element methods for boundary value problems involving PDEs (65N38) Finite volume methods for boundary value problems involving PDEs (65N08)
Related Items
Uses Software
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- A new conservative numerical scheme for flow problems on unstructured grids and unbounded domains
- Classical FEM-BEM coupling methods: nonlinearities, well-posedness, and adaptivity
- Guaranteed and fully robust a posteriori error estimates for conforming discretizations of diffusion problems with discontinuous coefficients
- A non-symmetric coupling of the finite volume method and the boundary element method
- HILBERT -- a MATLAB implementation of adaptive 2D-BEM. \(\underline {\text H}\)ilbert \(\underline {\text I}\)s a \(\underline {\text L}\)ovely \(\underline {\text B}\)oundary \(\underline {\text E}\)lement \(\underline {\text R}\)esearch \(\underline {\text T}\)ool
- Guaranteed and robust discontinuous Galerkin a posteriori error estimates for convection-diffusion-reaction problems
- A posteriori error estimators for convection-diffusion equations
- Quasi-optimal Convergence Rate for an Adaptive Boundary Element Method
- A Posteriori Error Estimates and Adaptive Mesh Refinement for the Coupling of the Finite Volume Method and the Boundary Element Method
- Is the one-equation coupling of finite and boundary element methods always stable?
- Coupling of the Finite Volume Element Method and the Boundary Element Method: An a Priori Convergence Result
- Robust Numerical Methods for Singularly Perturbed Differential Equations
- Boundary Integral Operators on Lipschitz Domains: Elementary Results
- A Convergent Adaptive Algorithm for Poisson’s Equation
- Local inverse estimates for non-local boundary integral operators
- An a posteriori error estimate for a first-kind integral equation
- Adaptive Vertex-Centered Finite Volume Methods with Convergence Rates
- On C. Neumann's method for second-order elliptic systems in domains with non-smooth boundaries
- A posteriori error estimate and h-adaptive algorithm on surfaces from Symm's integral equation
- A posteriori error estimators for elliptic equations with discontinuous coefficients
This page was built for publication: An Adaptive Nonsymmetric Finite Volume and Boundary Element Coupling Method for a Fluid Mechanics Interface Problem
