Pseudo-divergence-free element free Galerkin method for incompressible fluid flow
Author (s): Huerta, A., Vidal, Y. and Villon, P.
Journal: Computer Methods in Applied Mechanics and Engineering
Volume: 193, Issue 12 – 14
Pages: 1119 – 1136
Date: 2004
Abstract:
Incompressible modelling in finite elements has been a major concern since its early developments and has been extensively studied. However, incompressibility in mesh-free methods is still an open topic. Thus, instabilities or locking can preclude the use of mesh-free approximations in such problems. Here, a novel mesh-free formulation is proposed for incompressible flow. It is based on defining a pseudo-divergence-free interpolation space. That is, the finite dimensional interpolation space approaches a divergence-free space when the discretization is refined. Note that such an interpolation does not include any overhead in the computations. The numerical evaluations are performed using the inf-sup numerical test and two well-known benchmark examples for Stokes flow.
Bibtex:
@article{AH-HVV:04, Author = {Huerta, Antonio and Vidal, Yolanda and Villon, Pierre}, Title = {Pseudo-divergence-free element free {G}alerkin method for incompressible fluid flow}, Fjournal = {Computer Methods in Applied Mechanics and Engineering}, Journal = {Comput. Methods Appl. Mech. Eng.}, Volume = {193}, Number = {12--14}, Pages = {1119--1136}, Year = {2004}}