We present a stabilized numerical formulation for incompressible continua based on a higher‐order Finite Calculus (FIC) approach and the finite element method. The focus of the paper is on the derivation of a stabilized form for the mass balance (incompressibility) equation. The simpler form of the momentum equations neglecting the non‐linear convective terms, which is typical for incompressible solids, Stokes flows and Lagrangian flows is used for the sake of clarity. The discretized stabilized mass balance equation adds to the standard divergence of velocity term a pressure Laplacian and an additional boundary term. The boundary term is relevant for the accuracy of the numerical solution, especially for free surface flow problems. The Lap...
We present a general formulation for incompressible fluid flow analysis using the finite element met...
AbstractFormulated in terms of velocity, pressure and the extra stress tensor, the incompressible Na...
AbstractWe consider a pressure-stabilized, finite element approximation of incompressible flow probl...
A stabilized finite element formulation for incompressible viscous flows is derived. The starting po...
The final publication is available at Springer via http://dx.doi.org/10.1007/s00466-006-0060-yWe pre...
Discretizations of incompressible flow problems with pairs of finite element spaces that do not sati...
We discuss in this paper some implementation aspects of a finite element formulation for the incompr...
We present a general formulation for incompressible fluid flow analysis using the finite element met...
Due to simplicity in implementation and data structure, elements with equal-order interpolation of v...
We present a new stabilized finite element (FEM) formulation for incompressible flows based on the F...
We present a Lagrangian formulation for finite element analysis of quasi-incompressible fluids that ...
Many finite elements exhibit the so‐called ‘volumetric locking’ in the analysis of incom...
We present a formulation for analysis of turbulent incompressible flows using a stabilized finite el...
We present a formulation for analysis of turbulent incompressible flows using a stabilized finite el...
We present a general formulation for incompressible fluid flow analysis using the finite element met...
We present a general formulation for incompressible fluid flow analysis using the finite element met...
AbstractFormulated in terms of velocity, pressure and the extra stress tensor, the incompressible Na...
AbstractWe consider a pressure-stabilized, finite element approximation of incompressible flow probl...
A stabilized finite element formulation for incompressible viscous flows is derived. The starting po...
The final publication is available at Springer via http://dx.doi.org/10.1007/s00466-006-0060-yWe pre...
Discretizations of incompressible flow problems with pairs of finite element spaces that do not sati...
We discuss in this paper some implementation aspects of a finite element formulation for the incompr...
We present a general formulation for incompressible fluid flow analysis using the finite element met...
Due to simplicity in implementation and data structure, elements with equal-order interpolation of v...
We present a new stabilized finite element (FEM) formulation for incompressible flows based on the F...
We present a Lagrangian formulation for finite element analysis of quasi-incompressible fluids that ...
Many finite elements exhibit the so‐called ‘volumetric locking’ in the analysis of incom...
We present a formulation for analysis of turbulent incompressible flows using a stabilized finite el...
We present a formulation for analysis of turbulent incompressible flows using a stabilized finite el...
We present a general formulation for incompressible fluid flow analysis using the finite element met...
We present a general formulation for incompressible fluid flow analysis using the finite element met...
AbstractFormulated in terms of velocity, pressure and the extra stress tensor, the incompressible Na...
AbstractWe consider a pressure-stabilized, finite element approximation of incompressible flow probl...