Moving least-squares aided finite element method: a powerful means to predict flow fields in the presence of a solid part
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Publication:6574199
DOI10.1002/fld.5261MaRDI QIDQ6574199
Gert Heinrich, Sven Wießner, Mehdi Mostafaiyan
Publication date: 18 July 2024
Published in: International Journal for Numerical Methods in Fluids (Search for Journal in Brave)
Cites Work
- Unnamed Item
- Cut finite element methods for coupled bulk-surface problems
- Application of local least squares finite element method (LLSFEM) in the interface capturing of two-phase flow systems
- A meshless technique based on generalized moving least squares combined with the second-order semi-implicit backward differential formula for numerically solving time-dependent phase field models on the spheres
- The stable XFEM for two-phase flows
- A divergence-free generalized moving least squares approximation with its application
- A cut finite element method for coupled bulk-surface problems on time-dependent domains
- Interpolating stabilized moving least squares (MLS) approximation for 2D elliptic interface problems
- A cut finite element method for a Stokes interface problem
- Moving least-squares aided finite element method (MLS-FEM): a powerful means to predict pressure discontinuities of multi-phase flow fields and reduce spurious currents
- Moving least-squares aided finite element method (MLS-FEM): a powerful means to consider simultaneously velocity and pressure discontinuities of multi-phase flow fields
- Finite Elements and Fast Iterative Solvers
- Adaptive non-conformal mesh refinement and extended finite element method for viscous flow inside complex moving geometries
- Oil squeezing power losses in gears: a CFD analysis
- The extended/generalized finite element method: An overview of the method and its applications
- An efficient meshfree point collocation moving least squares method to solve the interface problems with nonhomogeneous jump conditions
- Extended finite element method for viscous flow inside complex three‐dimensional geometries with moving internal boundaries
- The intrinsic XFEM: a method for arbitrary discontinuities without additional unknowns
- A global, multi-scale simulation of laminar fluid mixing: the extended mapping method
- Novel Superfluids
- Meshless Galerkin analysis of the generalized Stokes problem
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