@Article{CiCP-20-4, author = {}, title = {Application of the LS-STAG Immersed Boundary/ Cut-Cell Method to Viscoelastic Flow Computations}, journal = {Communications in Computational Physics}, year = {2016}, volume = {20}, number = {4}, pages = {870--901}, abstract = {

This paper presents the extension of a well-established Immersed Boundary (IB)/cut-cell method, the LS-STAG method (Y. Cheny & O. Botella, J. Comput. Phys. Vol. 229, 1043-1076, 2010), to viscoelastic flow computations in complex geometries. We recall that for Newtonian flows, the LS-STAG method is based on the finite-volume method on staggered grids, where the IB boundary is represented by its level-set function. The discretization in the cut-cells is achieved by requiring that global conservation properties equations be satisfied at the discrete level, resulting in a stable and accurate method and, thanks to the level-set representation of the IB boundary, at low computational costs.
In the present work, we consider a general viscoelastic tensorial equation whose particular cases recover well-known constitutive laws such as the Oldroyd-B, White-Metzner and Giesekus models. Based on the LS-STAG discretization of the Newtonian stresses in the cut-cells, we have achieved a compatible velocity-pressure-stress discretization that prevents spurious oscillations of the stress tensor. Applications to popular benchmarks for viscoelastic fluids are presented: the four-to-one abrupt planar contraction flows with sharp and rounded re-entrant corners, for which experimental and numerical results are available. The results show that the LS-STAG method demonstrates an accuracy and robustness comparable to body-fitted methods.

}, issn = {1991-7120}, doi = {https://doi.org/10.4208/cicp.080615.010216a}, url = {https://global-sci.com/article/80221/application-of-the-ls-stag-immersed-boundary-cut-cell-method-to-viscoelastic-flow-computations} }