RT Journal Article ID 39091aa3531cc32f A1 Castro, C. E. A1 Toro, E. F. T1 NEW NUMERICAL APPROACHES TO MULTIPHASE FLOWS MODELING JF International Journal of Energetic Materials and Chemical Propulsion JO IJEMCP YR 2007 FD 2007-09-01 VO 6 IS 5 SP 609 OP 627 K1 Multiphase flows K1 Riemann solvers K1 finite volumes K1 non-conservative methods K1 conservative methods K1 shock capturing AB We present new numerical approaches for solving systems of partial differential equations associated with mathematical models for multiphase flows. We are concerned with the construction of modern numerical methods for solving the equations for hyperbolic models in conservative or non-conservative form. Here, we apply new approximate Riemann solvers for two-phase flow, whereby, a closed-form non-iterative solution can be obtained,1 and a new approach for general hyperbolic systems called EVILIN.2 In order to produce upwind numerical methods, the local approximate Riemann solution provides the necessary information to compute numerical fluxes that can be used in the finite volume approach or the Discontinuous Galerkin approach.
We utilize these approximate Riemann solvers locally to produce upwind numerical methods in the finite volume framework suitably modified to deal with systems in non-conservative form. Non-oscillatory schemes of second-order accuracy are then designed following the TVD approach. In addition, we construct second-order numerical schemes for multiphase flows following the recently proposed ADER3 approach, which also permits the handling of source terms to a high order of accuracy.
We perform a comprehensive and systematic assessment of the numerical methods constructed using reference numerical solutions and exact solutions that we have obtained for special cases. PB Begell House LK https://www.dl.begellhouse.com/journals/17bbb47e377ce023,6b745dc027a9ade2,39091aa3531cc32f.html