There are 6 repositories under exact-diagonalization topic.
Quantum Lattice Model Simulator Package
Exact diagonalization, Lehmann's representation, Two-particle Green's functions
Lanczos diagonalization of a Heisenberg-like Hamiltonian in Julia.
A package to simplify working with symmetry-adapted quantum many-body bases. Provides a good foundation for writing custom exact diagonalization and variational Monte Carlo software
A quantum operator algebra domain-specific language and exact diagonalization toolkit for C++11/14/17
A Julia code for performing exact diagonalization of fractional quantum Hall systems
An Exact Diagonalization Code for the 1D & 2D Hubbard Model
Random Integrators for many-body quantum systems
User-friendly exact diagonalization package written in Haskell. Can treat systems of up to 𝒪(42) spins!
Exact diagonalization for finite quantum systems
Exact Diagonalization for Hubbard model/Tight-binding model by MatheMatica
Code for exact diagonalization of BoseHubbard hamiltonian
Equilibrium ED solver for finite fermionic models that can compute Keldysh Green's functions
Quick and dirty TRIQS wrapper around the Pomerol exact diagonalization library
Data, code and scripts for a paper on entanglement after a quantum quench
Collection of tools for condensed matter computational physics.
Exact Diagonalization solver for Quantum Cluster Problems.
SOLID implementation of standard solid states physics
This calculates the minimum eigenvalue in the Hubbard model with the use of the exact diagonalization method.
Here we will compare one well-known (ED) and another new method (QAOA) for quantum simulations of many-body physics.
This repository contains an exact diagonalization implementation for Hubbard model written in Rust.
mini exact diagonalization code for many-body Green's functions of atoms
I will try to construct a many-body Hamiltonian and solve it using the basic python modules. For concreteness, we will solve two examples, namely the transverse field Ising (TFI) model and the toric code (TC) model in one and two spatial dimensions respectively.
Exact diagonalization of fermionic (many-body) systems
This is the starting point for the DMRG algorithm for Many-Body Physics.
📝 Code for the paper "Many-body quantum sign structures as non-glassy Ising models"
An efficient and intuitive python package for solving discrete, finite many-body physics problems using exact diagonalization.