Unstructured finite volume method for matrix free explicit solution of stress-strain fields in two dimensional problems with curved boundaries in equilibrium condition
From MaRDI portal
Publication:438046
DOI10.1016/j.apm.2011.08.001zbMath1243.74191OpenAlexW2087500780MaRDI QIDQ438046
Publication date: 20 July 2012
Published in: Applied Mathematical Modelling (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.apm.2011.08.001
finite volume methodunstructured meshes2D structural problemcurved boundarieslinear triangular element
Related Items
Free vibration analysis of laminated composite plates using meshless finite volume method, Earthquake damage estimation of the koyna concrete gravity dam using explicit GFVM model considering fluid-structure interaction, Air drag effect on dynamic analysis of moving nanoparticle problems using meshfree finite volume method, An efficient automatic adaptive algorithm for cohesive crack propagation modeling of concrete structures using matrix-free unstructured Galerkin finite volume method, Aerodynamic analysis of temperature-dependent FG-WCNTRC nanoplates under a moving nanoparticle using meshfree finite volume method, Simulation of 2D linear crack growth under constant load using GFVM and two-point displacement extrapolation method
Cites Work
- A matrix-free implicit unstructured multigrid finite volume method for simulating structural dynamics and fluid-structure interaction
- Dynamic solid mechanics using finite volume methods
- Comparison of finite element and finite volume methods application in geometrically nonlinear stress analysis
- Finite volume method for thermo-elasto-plastic stress analysis
- A cell vertex and cell centred finite volume method for plate bending analysis
- Finite volume method for stress analysis in complex domains
- Application of the finite volume method and unstructured meshes to linear elasticity
- A finite volume procedure to solve elastic solid mechanics problems in three dimensions on an unstructured mesh
- Unnamed Item
- Unnamed Item
