AVUXAF's repositories
Adaptive-Isogeometric-Analysis-using-optimal-transport-and-their-fast-solvers
We devise fast solvers and adaptive mesh generation procedures based on the Monge–Ampère Equation using B-Splines Finite Elements, within the Isogeometric Analysis framework
Isogeometric_analysis_for_Poisson_equation
Implementation of Poisson equation with Homogeneous and Non-homogeneous Dirichlet boundary conditions
Language:Python000
simplines
Simple and minimalistic library for B-Splines for IGA and CAD
Language:PythonGPL-3.0000
several-problems-psydac-python-codes
On solving several problems with IGA, Initialization with psydac: there is a psydac script for the Cahn-Hilliard equation using iso-geometric analysis.
Language:Jupyter NotebookApache-2.0000
Periodic_boundary_conditions_for_Poissoon_equation
We implement Poisson equation with periodic boundary conditions using Isogeometric Analysis TOOLS
Language:Python000
IGA-Bspline-Cahn-Halliard
Isogeometric analysis for numerical approximation of the Cahn-Halliard equation using the implicit scheme and the generalized alpha method.
Language:PythonGPL-3.0000