Python library for optimized interpolation.
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Updated
Nov 8, 2024 - C++
Python library for optimized interpolation.
Methods in numerical analysis. Includes: Lagrange interpolation, Chebyshev polynomials for optimal node spacing, iterative techniques to solve linear systems (Gauss-Seidel, Jacobi, SOR), SVD, PCA, and more.
Density Functional Theory in real space, for atoms, LDA and LSDA
Numerical analysis methods implemented in Python.
Simple (and not-so-simple) CFD solvers written in Fortran with Python plotting routines
Implemention of the Gauss-Seidel Iterative Method for solving systems of equations.
Projected Overrelaxed Jacobi (JORProx) and Gauss-Seidel (SORProx) GPU implementations.
MATLAB programs for solving the power-flow equations using either of methods: Gauss-Seidel (G-S), Newton-Raphson (N-R) & Fast Decoupled Load Flow (FDLF).
In numerical analysis, a numerical method is a mathematical tool designed to solve numerical problems. The implementation of a numerical method with an appropriate convergence check in a programming language is called a numerical algorithm
A repository containing python codes for the numerical methods I studied in Numerical Analysis course during Spring 2022 semester
This Module is Numerical analysis, an area of mathematics and computer science that creates, analyzes, and implements algorithms for obtaining numerical solutions to problems involving continuous variables. Such problems arise throughout the natural sciences, social sciences, engineering, medicine, and business.
Heat Equation using different solvers (Jacobi, Red-Black, Gaussian) in C using different paradigms (sequential, OpenMP, MPI, CUDA) - Assignments for the Concurrent, Parallel and Distributed Systems course @ UPC 2013
Solver for Power Flow Problem ⚡
Implentation of Back Substitution, Conjugate Gradient and Gauss Seidel using OpenMP parallelization
Solving the load flow problem using Guass-Seidel iterative method. Written in C++.
One-dimensional Transient Heat Conduction in a semi-infinite Domain
A web app solving Poisson's equation in electrostatics using finite difference methods for discretization, followed by gauss-seidel methods for solving the equations. Dirichlet conditions and charge density can be set.
Implementation for different numerical algorithms
A mathematic implementation in c++
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