An Eulerian–Lagrangian mixed discrete least squares meshfree method for incompressible multiphase flow problems

•The mixed discrete least squares meshfree (MDLSM) method is proposed to solve the multiphase flow problems.•Proposed hybrid form of Eulerian–Lagrangian method benefits from the advantages of both Eulerian and Lagrangian views.•A novel particle tracking method is proposed to overcome the drawback of...

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Bibliographic Details
Published in:Applied Mathematical Modelling 2019-12, Vol.76, p.193-224
Main Authors: Faraji Gargari, S., Kolahdoozan, M., Afshar, M.H., Dabiri, S.
Format: Article
Language:English
Subjects:
Approximation
Boundary conditions
Clustering
Computational fluid dynamics
Discrete least squares meshfree (DLSM) method
Fluid flow
Incompressible flow
Lagrangian equilibrium points
Least squares
Markers
Mathematical analysis
Meshfree methods
Meshless methods
Mixed discrete least squares meshfree (MDLSM) method
Moving least squares (MLS)
Multiphase flow
Multiphase problems
Partial differential equations
Phases
Single-phase flow
Tracking
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Summary:•The mixed discrete least squares meshfree (MDLSM) method is proposed to solve the multiphase flow problems.•Proposed hybrid form of Eulerian–Lagrangian method benefits from the advantages of both Eulerian and Lagrangian views.•A novel particle tracking method is proposed to overcome the drawback of Lagrangian particle tracking methods. Mixed discrete least squares meshfree (MDLSM) method has been developed as a truly meshfree method and successfully used to solve single-phase flow problems. In the MDLSM, a residual functional is minimized in terms of the nodal unknown parameters leading to a set of positive-definite system of algebraic equations. The functional is defined using a least square summation of the residual of the governing partial differential equations and its boundary conditions at all nodal points discretizing the computational domain. Unlike the discrete least squares meshfree (DLSM) which uses an irreducible form of the governing equations, the MDLSM uses a mixed form of the original governing equations allowing for direct calculation of the gradients leading to more accurate computational results. In this study, an Eulerian–Lagrangian MDLSM method is proposed to solve incompressible multiphase flow problems. In the Eulerian step, the MDLSM method is used to solve the governing phase averaged Navier–Stokes equations discretized at fixed nodal points to get the velocity and pressure fields. A Lagrangian based approach is then used to track different flow phases indexed by a set of marker points. The velocities of marker points are calculated by interpolating the velocity of fixed nodal points using a kernel approximation, which are then used to move the marker points as Lagrangian particles to track phases. To avoid unphysical clustering and dispersing of the marker points, as a common drawback of Lagrangian point tracking methods, a new approach is proposed to smooth the distribution of marker points. The hybrid Eulerian and Lagrangian characteristics of the approach used here provides clear advantages for the proposed method. Since the nodal points are static on the Eulerian step, the time-consuming moving least squares (MLS) approximation is implemented only once making the proposed method more efficient than corresponding fully Lagrangian methods. Furthermore, phases can be simply tracked using the Lagrangian phase tracking procedure. Efficiency of the proposed MDLSM multiphase method is evaluated using several benchmark problems and t
ISSN:0307-904X
1088-8691
0307-904X
DOI:10.1016/j.apm.2019.06.002