Numerical simulation of convection/diffusion phase change problems -- a review
From MaRDI portal
Publication:1315772
DOI10.1016/0017-9310(93)90071-DzbMath0790.76104OpenAlexW2011483274WikidataQ57694703 ScholiaQ57694703MaRDI QIDQ1315772
A. A. Samarskij, O. P. Iliev, Petr N. Vabishchevich, Alexander G. Churbanov
Publication date: 24 March 1994
Published in: International Journal of Heat and Mass Transfer (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/0017-9310(93)90071-d
Boussinesq approximationfree boundaryheat and mass transferinterface-fitting algorithmsinterface-smearing methodssolid/liquid phase changeStefan approximation
Diffusion (76R50) Multiphase and multicomponent flows (76T99) Forced convection (76R05) Research exposition (monographs, survey articles) pertaining to fluid mechanics (76-02)
Related Items
A consistent and conservative phase-field model for thermo-gas-liquid-solid flows including liquid-solid phase change ⋮ One‐step boundary knot method for discontinuous coefficient elliptic equations with interface jump conditions ⋮ Flow and heat transfer in a molten soil pool induced by electromagnetic fields generated by thermal plasmas ⋮ Stabilised DG-FEM for incompressible natural convection flows with boundary and moving interior layers on non-adapted meshes ⋮ Simulation of the process of infiltration into fractured porous soil in permafrost ⋮ Numerical conjugate air mixed convection/non-Newtonian liquid solidification for various cavity configurations and rheological models ⋮ Unnamed Item ⋮ Numerical computation of metal oxidation problems on bounded domains ⋮ Stability analysis of solution methods for a phase transition problem ⋮ A new algorithm for moving boundary problems subject to periodic boundary conditions ⋮ Unsteady conjugate mixed convection phase change of a power law non-Newtonian fluid in a square cavity ⋮ A conserving discretization for the free boundary in a two-dimensional Stefan problem ⋮ An online generalized multiscale finite element method for heat and mass transfer problem with artificial ground freezing
