The computation of multiphase flows presents a subtle energetic equilibrium between potential (i.e., surface) and kinetic energies. The use of traditional interface-capturing schemes provides no control over such a dynamic balance. In the spirit of the well-known symmetry-preserving and mimetic schemes, whose physics-compatible discretizations rely upon preserving the underlying mathematical structures of the space, we identify the corresponding structure and propose a new discretization strategy for curvature. The new scheme ensures conservation of mechanical energy (i.e., surface plus kinetic) up to temporal integration. Inviscid numerical simulations are performed to show the robustness of such a method.Peer ReviewedPostprint (author's f...
pre-printIn this paper, we present a method for animating multiphase flow of immiscible fluids using...
Harlow and Welch [Phys. Fluids 8 (1965) 2182–2189] introduced a discretization method for the incomp...
Dans certaines simulations numériques exigeantes de mécanique des fluides, ilest nécessaire de simul...
Multiphase flows present a rich variety of physical instabilities, which may turn into a set of inte...
The numerical simulation of multiphase flows presents several challenges, namely the transport of di...
The formulation of multiphase flows emanates from basic conservation laws: mass,momentum and energy....
International audienceWe propose a numerical scheme for the simulation of fluid-particles flows with...
The computation of multiphase flows presenting high density ratios, where the fluids involved are co...
In fluid mechanics the interaction of fluids with distinguishable material properties (e.g. water an...
The paper explains a method by which discretizations of the continuity and momentum equations can be...
Energy-conserving discretizations are widely regarded as a fundamental requirement for high-fidelity...
In this paper, we investigate numerically a diffuse interface model for the Navier-Stokes equation w...
Structure-preserving or mimetic discretisations are a class of advanced discretisation techniques de...
The Mass-Conserving Level-Set (MCLS) method is proposed to model multi-phase flows. The aim is to mo...
pre-printIn this paper, we present a method for animating multiphase flow of immiscible fluids using...
Harlow and Welch [Phys. Fluids 8 (1965) 2182–2189] introduced a discretization method for the incomp...
Dans certaines simulations numériques exigeantes de mécanique des fluides, ilest nécessaire de simul...
Multiphase flows present a rich variety of physical instabilities, which may turn into a set of inte...
The numerical simulation of multiphase flows presents several challenges, namely the transport of di...
The formulation of multiphase flows emanates from basic conservation laws: mass,momentum and energy....
International audienceWe propose a numerical scheme for the simulation of fluid-particles flows with...
The computation of multiphase flows presenting high density ratios, where the fluids involved are co...
In fluid mechanics the interaction of fluids with distinguishable material properties (e.g. water an...
The paper explains a method by which discretizations of the continuity and momentum equations can be...
Energy-conserving discretizations are widely regarded as a fundamental requirement for high-fidelity...
In this paper, we investigate numerically a diffuse interface model for the Navier-Stokes equation w...
Structure-preserving or mimetic discretisations are a class of advanced discretisation techniques de...
The Mass-Conserving Level-Set (MCLS) method is proposed to model multi-phase flows. The aim is to mo...
pre-printIn this paper, we present a method for animating multiphase flow of immiscible fluids using...
Harlow and Welch [Phys. Fluids 8 (1965) 2182–2189] introduced a discretization method for the incomp...
Dans certaines simulations numériques exigeantes de mécanique des fluides, ilest nécessaire de simul...