Single image super resolution algorithm RED+ADMM+De-QuIP
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Updated
Jan 24, 2024 - MATLAB
Quantum computing is a field of computing that uses quantum phenomena such as superposition and entanglement to perform operations on data. It is a rapidly growing field with potential applications in fields such as cryptography, chemistry, and optimization. Quantum computers can solve certain problems much faster than classical computers. Various programming languages such as Q#, Python and C++ can be used to write quantum algorithms to be run on quantum computers. The development of quantum computers is an active area of research and engineering.
Single image super resolution algorithm RED+ADMM+De-QuIP
Denoising by Quantum Interactive Patches
Plug-and-Play ADMM scheme based on an adaptive denoiser using the Schroedinger equation's solutions of quantum physics.
Signal and image denoising using quantum adaptive transformation.
This is a repository of the code accompanying "Quantum Carleman Lattice Boltzmann Simulation of Fluids". It implements the linear embedding introduced by Kowalski to describe nonlinear dynamics in terms of bosonic Hamiltonians.
De-QuIP-Despeckling (Despeckling by Quantum Interactive Patches)
Type an M x M matrix for your open quantum system Hamiltonian, and give a spectral density (analytic or numerical). FeynDyn gives the density matrix dynamics according to the Leggett-Caldeira bath or the Feynman-Vernon bath at any temperature. Can do up to 16 qubits (65536 levels) and infinitely many bath modes. Email nike@hpqc.org for the lates…
Lloyd-Max Algorithm Gradual - Vector Quantum
Functions for simulatin quantum computing in GNU Octave and Matlab
This code is for Matlab's users who need speed when computing large exponential matrices full and sparse.
A basic quantum computing package written in MATLAB. Uses the density matrix backend for gate/channel operations.
1D Schroedinger solver in semiconductor with non-parabolicity
Contains the programs used to generate the results in the paper: Witnessing Negative Conditional Entropy
1D Schroedinger solver in semiconductor with non-parabolicity in Zinc-Blende
Poisson solver for semiconductor hetero-structures
1D Schroedinger solver in semiconductor with effective mass
2D time independent Schroedinger equation solver on inhomogeneous grid
Schrodinger-Poisson solver in 1D demonstrator
1D Time independent Schroedinger equation solver
3D Time independent Schroedinger equation solver
Created by Richard Feynman and Yuri Manin