In the present work, we developed a numerical analysis for an electroosmotic flow circulating in a rectangular microchannel considering electrolyte viscosity as a function of the induced electric field which is also reflected in the slip condition imposed on the system walls, since the slip length is a function of the fluid viscosity. Viscoelectric effect analysis in an electroosmotic flow with microchannel wall slip The obtained triangular mesh can be used to develop a storm surge prediction model for the Bay of Bengal region implementing FEM. All the major islands are also incorporated in the final mesh. Then FreeFem++ is used to create triangular mesh for the whole domain from the generated edp file. A C++ routine is used to generate an edp file for triangular mesh using the extracted coordinates. A MATLAB routine and the cubic spline interpolation have been used to extract the coordinates of the points on the boundary of the whole domain and the points on the boundary of the islands from a colour image of the domain. The area between 15º N and 23º N Latitudes and 85º E and 95º E Longitudes is considered as the physical domain. In this study, the Bay of Bengal domain has been approximated using triangular mesh so that the finite element method (FEM) can be employed on it. Rescale offers academic users up to 500 core hours on HPC platform, 7 lines of python code is all you need to run aįreeFEM simulation in the cloud. Written in C++ to optimize for speed, FreeFEM is interfaced with the With the best open-source mesh and visualization software like Neo-Hookean, Mooney-Rivlin (nonlinear elasticity)įreeFEM has it own internal mesher, called BAMG, and is compatible.
Incompressible Navier-Stokes (using the P1-P2 Taylor Hood element)
FreeFEM offers a large list of finiteĮlements, like the Lagrange, Taylor-Hood, etc., usable in theĬontinuous and discontinuous Galerkin method framework. It allows you to easily implement your own physics modules using the Solver used by thousands of researchers across the world. FreeFEM is a popular 2D and 3D partial differential equations (PDE)
0 kommentar(er)
