There are 9 repositories under ising-model topic.
Assortment of code for model systems in computational physics. github.com/rajeshrinet/compPhy
Statistical Mechanics on Lattices
Python implementation of the Ising model
Markov chain Monte Carlo solver for lattice spin systems implemented in Julialang
A program implementing Metropolis Monte Carlo for the 2D square-lattice Ising model and the spin block renormalization
Generate 1- and 2-electron integrals so that molecular quantum chemistry software can be used for model Hamiltonians.
An information-theoretic pipeline for methylation analysis of WGBS data
Quantum Monte Carlo methods for Ising model
A classic implementation in C++ of the famous 2D Ising Model.
Differentiable Tensor Renormalization Group for square Ising
Coherent Ising Machine implementation, simulation, Python codes for MC simulation
Monte Carlo simulations of magnetic systems in Python
PXO (Poly-XTAL Operations). Generate, analyze and export complex 2D space partitions like metallic grain structures
PCA, Factor Analysis, CCA, Sparse Covariance Matrix Estimation, Imputation, Multiple Hypothesis Testing
Repository for the Software and Computing for Applied Physics Project
Fun simulations and numerical calculations for the everyday physicist.
Repository for `Glassy dynamics using Quantum Computers` Team in Qiskit Hackathon Europe
Simulating the two-dimensional Ising model using the Metropolis-Hastings algorithm.
Monte Carlo simulation of the Ising Model using the Metropolis Algorithm
ISING_2D_SIMULATION is a FORTRAN77 program which carries out a Monte Carlo simulation of a 2D Ising model, using gnuplot to display the initial and final configurations.
The algorithm based on the UBQP model (Aref et al. 2018) for computing the exact value of frustration index (also called line index of balance)
Fast Monte Carlo simulation of the Ising model written in Python
Open source MaxCut solver
Implementations of the Heisenberg model in statistical mechanics, done in Python 2.7.12 (with NumPy, SciPy, and matplotlib).
Simplest implimentation of D-dimensional classical Ising model in Julia.
A C++ program for simulating the 2D Ising model using classical Monte Carlo method. External magnetic field is introduced. Spontaneous magnetization is observed below the transition temperature. Hysteresis loop for magnetization versus external field emerges below the transition temperature.