There are 5 repositories under finite-difference-method topic.
Python package for solving partial differential equations using finite differences.
Linear operators for discretizations of differential equations and scientific machine learning (SciML)
Automatic Finite Difference PDE solving with Julia SciML
2D incompressible fluid solver implemented in Taichi.
Pure Julia implementation of the finite difference frequency domain (FDFD) method for electromagnetics
A Julia Toolbox for Geophysical Modeling and Inverse Problems
A Finite Difference Method Engine in C++
Finite-Difference Approximations to the Heat Equation. Implementation of schemes: Forward Time, Centered Space; Backward Time, Centered Space; Crank-Nicolson.
Solve the 1D forced Burgers equation with high order finite elements and finite difference schemes.
In analogy with thirdorder.py in ShengBTE, Fourthorder.py is developed to calculate fourth-order interatomic force-constants (4th-IFCs). Please post your questions in the 'Discussion' section of FourPhonon repository.
A machine learning boosted parallel-in-time differential equation solver framework.
The 2DECOMP&FFT library provides access to a slabs and pencil decompositions as well as FFTs.
Python package for the analysis and visualisation of finite-difference fields.
A 1D heat conduction solver using Finite Difference Method and implicit backward Euler time scheme
Numerical methods to solve Partial Differential Equations
This file includes the code I've written for the course Numerical Method in finance, Stochastic Calculus in Spring 2020.
Implementation of Numerical Analysis algorithms/methods in Python
finite difference for magnetotelluric 2D forward modeling
Solves Navier-Stokes equations for the 2D cavity flow using vorticity-stream function formulation
Solving partial differential equations using finite difference methods on Julia.
Navier-Stokes Solver with moving elliptic bodies
Numerical Analysis Problems and Solutions
Algebraic and Elliptic PDE based structured grid generation methods
This project aims to solve the 2D Navier-Stokes equations using the finite difference method for single-phase laminar flow and verify results using the benchmark lid cavity test.