Journal
JOURNAL OF COMPUTATIONAL PHYSICS
Volume 474, Issue -, Pages -Publisher
ACADEMIC PRESS INC ELSEVIER SCIENCE
DOI: 10.1016/j.jcp.2022.111809
Keywords
Incompressible smoothed particle hydrodynamics; Free-surface flow; Phase change; Solidification and melting; Implicit viscosity
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This paper presents an extended ISPH method with a solid-liquid phase change model, which is capable of simulating free-surface flow coupled with solid-liquid phase change. The improved method includes a novel implicit viscosity solver, accurate wall boundary conditions, an enhanced implicit viscosity Laplacian operator, a dynamic solid boundary criterion, and various heat transfer and viscosity models. The simulation results demonstrate the effectiveness and advantages of the proposed ISPH method, providing potential engineering applications.
Free-surface flow coupled with solid-liquid phase change can be observed in many industrial applications, and it has a great influence on many industrial processes. In this paper, the Incompressible Smoothed Particle Hydrodynamics (ISPH) method is extended with solid-liquid phase change model. A novel implicit viscosity solver is adopted in which the implicit viscosity solver is moved behind the calculation of pressure force to eliminate the time step limitation and the numerical creeping of high viscosity. To reduce the compression caused by the delayed incompressibility correction, accurate wall boundary conditions are applied and an enhanced implicit viscosity Laplacian operator is proposed. Besides, a dynamic solid boundary criterion is proposed to deal with the changing solid -liquid interface. In addition, the enthalpy-based heat transfer model and the mushy zone viscosity model are introduced. The inter-particle conductivity between liquid and solid is adopted to consider the large contact thermal resistance between fluid and solid. As will be shown, our ISPH method is verified in its performance in simulating free-surface flow coupled with solid-liquid phase change by four numerical examples and has good advantages in simulation quality over the existing implicit viscosity algorithm, which, hopefully, is to provide applications in engineering.(c) 2022 Elsevier Inc. All rights reserved.
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