Weighted average flux method and flux limiters for the numerical simulation of shock waves in rigid porous media
From MaRDI portal
Publication:4805199
DOI10.1002/fld.416zbMath1025.76032OpenAlexW2091792209MaRDI QIDQ4805199
Publication date: 11 May 2003
Published in: International Journal for Numerical Methods in Fluids (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1002/fld.416
Shock waves and blast waves in fluid mechanics (76L05) Flows in porous media; filtration; seepage (76S05) Finite difference methods applied to problems in fluid mechanics (76M20)
Related Items
Numerical simulation of dilute particle laden flows by wavelet BEM-FEM ⋮ A least squares finite element method with high degree element shape functions for one-dimensional Helmholtz equation ⋮ Numerical study on the interaction between a shock wave and porous foam and the mitigation mechanism of porous foam filling a straight tube on a blast wave ⋮ Boundary element formulations for the numerical solution of two-dimensional diffusion problems with variable coefficients ⋮ On 3-D coupled BEM-FEM simulation of nonlinear electro-elastostatics ⋮ A 2-D coupled BEM-FEM simulation of electro-elastostatics at large strain ⋮ Comparison between wavelet and fast multipole data sparse approximations for Poisson and kinematics boundary-domain integral equations ⋮ A novel numerical strategy for the simulation of irregular nonlinear waves and their effects on the dynamic response of offshore wind turbines ⋮ Boundary element analysis of uncoupled transient thermo-elastic problems with time- and space-dependent heat sources ⋮ The WAF scheme for the isentropic drift-flux model of compressible two-phase flows ⋮ Integral equation formulation of an unsteady diffusion-convection equation with variable coefficient and velocity ⋮ Evolutionary shape optimization of thermoelastic bodies exchanging heat by convection and radiation ⋮ On the propagation of a normal shock wave through a layer of incompressible porous material ⋮ A semi-analytical approach for radiation and scattering problems with circular boundaries
Cites Work
