Publication: On hybrid residual distribution–Galerkin discretizations for steady and time dependent viscous laminar flows
On hybrid residual distribution–Galerkin discretizations for steady and time dependent viscous laminar flows
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Dobeš, J., Ricchiuto, M., Abgrall, R., & Deconinck, H. (2015). On hybrid residual distribution–Galerkin discretizations for steady and time dependent viscous laminar flows. Computer Methods in Applied Mechanics and Engineering, 283, 1336–1356. https://doi.org/10.1016/j.cma.2014.09.002
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This paper is concerned with the extension of second order residual distribution (RD) schemes to time dependent viscous flows. We provide a critical analysis of the use of a hybrid RD-Galerkin approach for both steady and time dependent problems. In particular, as in Ricchiuto (2008) and Villedieu etal. (2011), we study the coupling of a Residual Distribution (RD) discretization of the advection operator with a Galerkin approximation for the second order derivatives, with a Peclet dependent modulation of the upwinding introduced by th
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- Ricchiuto, Mario
- Deconinck, Herman
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Dobeš, J., Ricchiuto, M., Abgrall, R., & Deconinck, H. (2015). On hybrid residual distribution–Galerkin discretizations for steady and time dependent viscous laminar flows. Computer Methods in Applied Mechanics and Engineering, 283, 1336–1356. https://doi.org/10.1016/j.cma.2014.09.002
