Multiphase dynamics in arbitrary geometries on fixed Cartesian grids
Journal of Computational Physics
The point-set method: front-tracking without connectivity
Journal of Computational Physics
A fixed-grid, sharp-interface method for bubble dynamics and phase change
Journal of Computational Physics
Level set methods: an overview and some recent results
Journal of Computational Physics
A front-tracking method for the computations of multiphase flow
Journal of Computational Physics
Computational Fluid Dynamics with Moving Boundaries
Computational Fluid Dynamics with Moving Boundaries
Journal of Computational Physics
A hybrid particle level set method for improved interface capturing
Journal of Computational Physics
Journal of Computational Physics
Journal of Computational Physics
Journal of Computational Physics
Journal of Computational Physics
Journal of Computational Physics
Computational Modeling for Fluid Flow and Interfacial Transport (Dover Books on Engineering)
Computational Modeling for Fluid Flow and Interfacial Transport (Dover Books on Engineering)
Principles of Computational Fluid Dynamics
Principles of Computational Fluid Dynamics
Fast and robust solvers for pressure-correction in bubbly flow problems
Journal of Computational Physics
Journal of Computational Physics
Hi-index | 31.46 |
Multiphase flows associated with interfacial dynamics, steep jumps in fluid properties and moving boundaries between different phases pose substantial computational challenges in terms of both modeling as well as computational efficiency. The present work extends a marker-based immersed boundary, or front tracking, technique to model the three-dimensional interfacial dynamics. It tracks the moving boundary using triangulated surface grids and solves the flow governing equations on a stationary Cartesian grid. A locally adaptive grid is employed to help meet the resolution requirements based on the interface location and solution features. The interface resolution is controlled via a conservative restructuring technique satisfying mass continuity. An improved level contour reconstruction algorithm for topology change, preserving the interface connectivity information, is presented highlighting various algorithmic difficulties and implemented remedies. The outlines of a finite-volume, staggered grid Navier-Stokes solution using the projection method are discussed. The impact of conservative interface restructuring and reconstruction has been assessed against mass-conservation and spurious velocity errors. The overall capabilities of the developed algorithms have been demonstrated for large density ratios, O(1000), interfacial flows using various rising bubbles and drop collision/coalescence computations involving coalescence and break-up dynamics.