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FreeFem++ is a programming language and a software focused on solving partial differential equations using the finite element method. FreeFem++ is written in C++ and developed and maintained by Université Pierre et Marie Curie and Laboratoire Jacques-Louis Lions .
Software Features Developer Version Released License Price Platform Abaqus: FEA, Multi-physics, Implict & Explict. TriMech Group: 2025: 1979: Paid: Linux, Windows ...
The reason I have created that project on GitHub is to separate complexity, and it seems to work. I would be very happy if you can propose any other way to do the job, so I can stop maintaining it. However, just dropping it out does not look to be a reasonable solution for me at the moment.
MFEM is an open-source C++ library for solving partial differential equations using the finite element method, developed and maintained by researchers at the Lawrence Livermore National Laboratory and the MFEM open-source community on GitHub. MFEM is free software released under a BSD license. [1]
The FEniCS Project is a collection of free and open-source software components with the common goal to enable automated solution of differential equations.The components provide scientific computing tools for working with computational meshes, finite-element variational formulations of ordinary and partial differential equations, and numerical linear algebra.
su2code.github.io SU2 is a suite of open-source software tools written in C++ for the numerical solution of partial differential equations (PDE) and performing PDE-constrained optimization . The primary applications are computational fluid dynamics and aerodynamic shape optimization , [ 2 ] but has been extended to treat more general equations ...
The streamline upwind Petrov–Galerkin pressure-stabilizing Petrov–Galerkin formulation for incompressible Navier–Stokes equations can be used for finite element computations of high Reynolds number incompressible flow using equal order of finite element space (i.e. ) by introducing additional stabilization terms in the Navier–Stokes Galerkin formulation.
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