Unified semi-analytical wall boundary conditions for inviscid, laminar or turbulent flows in the meshless SPH method

M. Ferrand, D. R. Laurence, B. D. Rogers, D. Violeau, C. Kassiotis

    Research output: Contribution to journalArticlepeer-review


    Wall boundary conditions in smoothed particle hydrodynamics (SPH) is a key issue to perform accurate simulations. We propose here a new approach based on a renormalising factor for writing all boundary terms. This factor depends on the local shape of a wall and on the position of a particle relative to the wall, which is described by segments (in two-dimensions), instead of the cumbersome fictitious or ghost particles used in most existing SPH models. By solving a dynamic equation for the renormalising factor, we significantly improve traditional wall treatment in SPH, for pressure forces, wall friction and turbulent conditions. The new model is demonstrated for cases including hydrostatic conditions for still water in a tank of complex geometry and a dam break over triangular bed profile with sharp angle where significant improved behaviour is obtained in comparison with the conventional boundary techniques. The latter case is also compared with a finite volume and volume-of-fluid scheme. The performance of the model for a two-dimensional laminar flow in a channel is demonstrated where the profiles of velocity are in agreement with the theoretical ones, demonstrating that the derived wall shear stress balances the pressure gradient. Finally, the performance of the model is demonstrated for flow in a schematic fish pass where both the velocity field and turbulent viscosity fields are satisfactorily reproduced compared with mesh-based codes. © 2012 John Wiley & Sons, Ltd.
    Original languageEnglish
    Pages (from-to)446-472
    Number of pages26
    JournalInternational Journal for Numerical Methods in Fluids
    Issue number4
    Publication statusPublished - 10 Feb 2013


    • Free surface
    • Lagrangian
    • Laminar flow
    • Meshfree
    • Navier-Stokes
    • Smoothed particles hydrodynamics
    • Turbulent flow
    • Viscous flows
    • Wall boundary conditions


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