An adaptive coupled level-set/volume-of-fluid interface capturing method for unstructured triangular grids

We present an adaptive coupled level-set/volume-of-fluid (ACLSVOF) method for interfacial flow simulations on unstructured triangular grids. At each time step, we evolve both the level set function and the volume fraction. The level set function is evolved by solving the level set advection equation using a discontinuous Galerkin finite element method. The volume fraction advection is performed using a Lagrangian-Eulerian method. The interface is reconstructed based on both the level set and the volume fraction information. In particular, the interface normal vector is calculated from the level set function while the line constant is determined by enforcing mass conservation based on the volume fraction. Different from previous works, we have developed an analytic method for finding the line constant on triangular grids, which makes interface reconstruction efficient and conserves volume of fluid exactly. The level set function is finally reinitialized to the signed distance to the reconstructed interface. Since the level set function is continuous, the normal vector calculation is easy and accurate compared to a classic volume-of-fluid method, while tracking the volume fraction is essential for enforcing mass conservation. The method is also coupled to a finite element based Stokes flow solver. The code validation shows that our method is second order and mass is conserved very accurately. In addition, owing to the adaptive grid algorithm we can resolve complex interface changes and interfaces of high curvature efficiently and accurately.

[1]  D. B. Kothe,et al.  A Parallel, Volume-Tracking Algorithm for Unstructured Meshes , 1996, Parallel CFD.

[2]  R. Scardovelli,et al.  A mixed markers and volume-of-fluid method for the reconstruction and advection of interfaces in two-phase and free-boundary flows , 2003 .

[3]  M. Renardy,et al.  PROST: a parabolic reconstruction of surface tension for the volume-of-fluid method , 2002 .

[4]  E. Puckett,et al.  Second-Order Accurate Volume-of-Fluid Algorithms for Tracking Material Interfaces , 2013 .

[5]  F. Harlow,et al.  Numerical Calculation of Time‐Dependent Viscous Incompressible Flow of Fluid with Free Surface , 1965 .

[6]  Xiaoming Zheng,et al.  Adaptive unstructured volume remeshing - I: The method , 2005 .

[7]  C. W. Hirt,et al.  Volume of fluid (VOF) method for the dynamics of free boundaries , 1981 .

[8]  R. Scardovelli,et al.  A surface marker algorithm coupled to an area-preserving marker redistribution method for three-dimensional interface tracking , 2004 .

[9]  S. Osher,et al.  Level set methods: an overview and some recent results , 2001 .

[10]  S. Zalesak Fully multidimensional flux-corrected transport algorithms for fluids , 1979 .

[11]  D. M. Anderson,et al.  DIFFUSE-INTERFACE METHODS IN FLUID MECHANICS , 1997 .

[12]  Marius Paraschivoiu,et al.  Second order accurate volume tracking based on remapping for triangular meshes , 2003 .

[13]  S. Zaleski,et al.  Interface reconstruction with least‐square fit and split Eulerian–Lagrangian advection , 2003 .

[14]  Howard A. Stone,et al.  Dynamics of Drop Deformation and Breakup in Viscous Fluids , 1994 .

[15]  D. Jacqmin Regular Article: Calculation of Two-Phase Navier–Stokes Flows Using Phase-Field Modeling , 1999 .

[16]  Ivan E. Sutherland,et al.  Reentrant polygon clipping , 1974, Commun. ACM.

[17]  M. Sussman A second order coupled level set and volume-of-fluid method for computing growth and collapse of vapor bubbles , 2003 .

[18]  J. Lowengrub,et al.  A surfactant-conserving volume-of-fluid method for interfacial flows with insoluble surfactant , 2004 .

[19]  M. Fortin,et al.  A stable finite element for the stokes equations , 1984 .

[20]  Andrew S. Glassner,et al.  Graphics Gems , 1990 .

[21]  Chi-Wang Shu,et al.  The Runge-Kutta local projection discontinuous Galerkin finite element method for conservation laws. IV. The multidimensional case , 1990 .

[22]  V. Cristini,et al.  Adaptive unstructured volume remeshing - II: Application to two- and three-dimensional level-set simulations of multiphase flow , 2005 .

[23]  Mark Sussman,et al.  A parallelized, adaptive algorithm for multiphase flows in general geometries , 2005 .

[24]  M. Sussman,et al.  A Coupled Level Set and Volume-of-Fluid Method for Computing 3D and Axisymmetric Incompressible Two-Phase Flows , 2000 .

[25]  L. G. Leal,et al.  An experimental investigation of drop deformation and breakup in steady, two-dimensional linear flows , 1986, Journal of Fluid Mechanics.

[26]  S. Zaleski,et al.  DIRECT NUMERICAL SIMULATION OF FREE-SURFACE AND INTERFACIAL FLOW , 1999 .

[27]  Viorel Mihalef,et al.  A Second-Order Adaptive Sharp-Interface Method for Incompressible Multiphase Flow , 2006 .

[28]  G. Wittum,et al.  Two-Phase Flows on Interface Refined Grids Modeled with VOF, Staggered Finite Volumes, and Spline Interpolants , 2001 .

[29]  W. Rider,et al.  Reconstructing Volume Tracking , 1998 .

[30]  J. Sethian,et al.  FRONTS PROPAGATING WITH CURVATURE DEPENDENT SPEED: ALGORITHMS BASED ON HAMILTON-JACOB1 FORMULATIONS , 2003 .

[31]  Xiaofeng Yang,et al.  An arbitrary Lagrangian -Eulerian method for interfacial flows with insoluble surfactants , 2005 .

[32]  Geoffrey Ingram Taylor,et al.  The formation of emulsions in definable fields of flow , 1934 .

[33]  David J. Pine,et al.  Drop deformation, breakup, and coalescence with compatibilizer , 2000 .

[34]  Gang Wang,et al.  A computational Lagrangian–Eulerian advection remap for free surface flows , 2004 .

[35]  M. Rudman INTERNATIONAL JOURNAL FOR NUMERICAL METHODS IN FLUIDS, VOL. 24, 671–691 (1997) VOLUME-TRACKING METHODS FOR INTERFACIAL FLOW CALCULATIONS , 2022 .

[36]  P. Colella,et al.  A second-order projection method for the incompressible navier-stokes equations , 1989 .

[37]  S. Osher,et al.  A level set approach for computing solutions to incompressible two-phase flow , 1994 .

[38]  Patrick Patrick Anderson,et al.  Diffuse interface modeling of the morphology and rheology of immiscible polymer blends , 2003 .

[39]  Vittorio Cristini,et al.  An adaptive mesh algorithm for evolving surfaces: simulation of drop breakup and coalescence , 2001 .

[40]  G. Tryggvason,et al.  A front-tracking method for viscous, incompressible, multi-fluid flows , 1992 .

[41]  Michael Siegel,et al.  Cusp formation for time-evolving bubbles in two-dimensional Stokes flow , 2000, Journal of Fluid Mechanics.

[42]  D. B. Kothe,et al.  Convergence and accuracy of kernel-based continuum surface tension models , 1998 .

[43]  G. Golub,et al.  Inexact and preconditioned Uzawa algorithms for saddle point problems , 1994 .

[44]  Allen Van Gelder Efficient Computation of Polygon Area and Polyhedron Volume , 1995 .

[45]  Ian M. Mitchell,et al.  A hybrid particle level set method for improved interface capturing , 2002 .

[46]  D. Juric,et al.  A front-tracking method for the computations of multiphase flow , 2001 .

[47]  J. Sethian,et al.  LEVEL SET METHODS FOR FLUID INTERFACES , 2003 .

[48]  J. Brock,et al.  Volume tracking of interfaces having surface tension in two and three dimensions , 1996 .

[49]  S. Osher,et al.  An improved level set method for incompressible two-phase flows , 1998 .

[50]  J. Lowengrub,et al.  Conservative multigrid methods for Cahn-Hilliard fluids , 2004 .

[51]  Mark Sussman,et al.  An Efficient, Interface-Preserving Level Set Redistancing Algorithm and Its Application to Interfacial Incompressible Fluid Flow , 1999, SIAM J. Sci. Comput..

[52]  Chi-Wang Shu,et al.  Runge–Kutta Discontinuous Galerkin Methods for Convection-Dominated Problems , 2001, J. Sci. Comput..

[53]  Xiaofeng Yang,et al.  Analytic relations for reconstructing piecewise linear interfaces in triangular and tetrahedral grids , 2006, J. Comput. Phys..

[54]  Deborah Greaves,et al.  A quadtree adaptive method for simulating fluid flows with moving interfaces , 2004 .

[55]  S. Osher,et al.  Algorithms Based on Hamilton-Jacobi Formulations , 1988 .

[56]  Peter R. Atherton,et al.  Hidden surface removal using polygon area sorting , 1977, SIGGRAPH.

[57]  Héctor D. Ceniceros,et al.  Computation of multiphase systems with phase field models , 2002 .

[58]  J. López,et al.  A volume of fluid method based on multidimensional advection and spline interface reconstruction , 2004 .

[59]  R. LeVeque High-resolution conservative algorithms for advection in incompressible flow , 1996 .

[60]  W. Rider,et al.  Stretching and tearing interface tracking methods , 1995 .