Communication publiée dans un ouvrage (Colloques et congrès scientifiques)
On some drawbacks and possible improvements of a Lagrangian finite element approach for simulating incompressible flows
Cerquaglia, Marco Lucio; Deliège, Geoffrey; Boman, Romainet al.
2015 • In Oñate, E.; Bischoff, M.; Owen, D.R.J.et al. (Eds.) Proceedings of the IV International Conference on Particle-Based Methods – Fundamentals and Applications
Cremonesi M., Frangi A. and Perego U. A Lagrangian finite element approach for the analysis of fluid-structure interaction problems. Int. J. Num. Meth. Engng. (2010) 84:610-630.
Donea J., Huerta A., Ponthot J.P. and Rodriguez-Ferran A. Encyclopedia of Computational Mechanics, Stein E, de Borst R., Hughes T.J.R. (eds). John Wiley & Sons (2004).
Edelsbrunner H. and Mucke E.P. Three dimensional alpha shapes. ACM Transaction on Graphics (1994) 13(1):43-72.
Hirt C.W., Nichols B.D. Volume of fluid (VOF) method for the dynamics of free boundaries. J. Comput. Physics (1981) 39:201-225.
Idelsohn S., Calvo N. and Onate E. Polyhedrization of an arbitrary 3D point set. Comput. Methods Appl. Mech. Engrg. (2003) 192:2649-2667.
Idelsohn S. and Onate E. To mesh or not to mesh. That is the question... Comput. Methods Appl. Mech. Engrg. (2006) 195:4681-4696.
Idelsohn S., Onate E., Calvo N. and Del Pin F. The meshless finite element method.Int. J. Num. Meth. Engng. (2003) 58:893-912.
Idelsohn S., Onate E., Del Pin F., Calvo N. Fluid-structure interaction using the particle finite element method. Comput. Methods Appl. Mech. Engrg. (2006) 195:21002123.
Koshizuka S. and Oka Y. Moving particle semi-implicit method for fragmentation and incompressible fluid. Nuclear science and engineering (1996) 123:421-434.
Limache A. and Idelsohn S. Laplace form of Navier-Stokes equations: A safe path or a wrong way? Mecanica Computacional (2006) 25:151-168.
Onate E., Idelsohn S., Del Pin F. and Aubry R. The particle finite element method. An overview. Int. J. Comput. Methods (2004) 61:964-989.
Radovitzky R. and Ortiz M. Lagrangian finite element analysis of Newtonian fluid flows. Int. J. Num. Meth. Engng. (1998) 43:607-619.
Tezduyar T.E., Mittal S., Ray S.E., Shih R. Incompressible flow computations with stabilized bilinear and linear equal-order-interpolation velocity-pressure elements. Comput. Methods Appl. Mech. Engrg. (1992) 95(2):221-242.