Add to ORKGThe Hamiltonian of a quantum system governs the dynamics of the system via the Schrodinger equation. In this paper, the Hamiltonian is reconstructed in the Pauli basis using measurables on random states forming a time series dataset. The time propagation is implemented through Trotterization and optimized variationally with gradients computed on the quantum circuit. We validate our output by reproducing the dynamics of unseen observables on a randomly chosen state not used for the optimization. Unlike the existing techniques that try and exploit the structure/properties of the Hamiltonian, our scheme is general and provides freedom with regard to what observables or initial states can be used while still remaining efficient with regard to i...
Given the recent developments in quantum techniques, modeling the physical Hamiltonian of a target q...
Identifying an accurate model for the dynamics of a quantum system is a vexing problem that underlie...
We propose an efficient quantum algorithm for simulating the dynamics of general Hamiltonian systems...
In this paper, we propose a method to learn the unknown Hamiltonian governing the dynamics of a quan...
Learning the unknown Hamiltonian governing the dynamics of a quantum many-body system is a challengi...
The Hamiltonian of an isolated quantum mechanical system determines its dynamics and physical behavi...
Hamiltonian learning is crucial to the certification of quantum devices and quantum simulators. In t...
In this work we combine two distinct machine learning methodologies, sequential Monte Carlo and Baye...
We study the problem of learning a Hamiltonian $H$ to precision $\varepsilon$, supposing we are give...
In this work we combine two distinct machine learning methodologies, sequential Monte Carlo and Baye...
We introduce a new approach to learn Hamiltonians through a resource that we call the pseudo-Choi st...
The dual tasks of quantum Hamiltonian learning and quantum Gibbs sampling are relevant to many impor...
Quantum state tomography is an essential tool for the characterization and verification of quantum s...
Hamiltonian learning is an important procedure in quantum system identification, calibration, and su...
We propose a variational quantum algorithm to study the real time dynamics of quantum systems as a g...
Given the recent developments in quantum techniques, modeling the physical Hamiltonian of a target q...
Identifying an accurate model for the dynamics of a quantum system is a vexing problem that underlie...
We propose an efficient quantum algorithm for simulating the dynamics of general Hamiltonian systems...
In this paper, we propose a method to learn the unknown Hamiltonian governing the dynamics of a quan...
Learning the unknown Hamiltonian governing the dynamics of a quantum many-body system is a challengi...
The Hamiltonian of an isolated quantum mechanical system determines its dynamics and physical behavi...
Hamiltonian learning is crucial to the certification of quantum devices and quantum simulators. In t...
In this work we combine two distinct machine learning methodologies, sequential Monte Carlo and Baye...
We study the problem of learning a Hamiltonian $H$ to precision $\varepsilon$, supposing we are give...
In this work we combine two distinct machine learning methodologies, sequential Monte Carlo and Baye...
We introduce a new approach to learn Hamiltonians through a resource that we call the pseudo-Choi st...
The dual tasks of quantum Hamiltonian learning and quantum Gibbs sampling are relevant to many impor...
Quantum state tomography is an essential tool for the characterization and verification of quantum s...
Hamiltonian learning is an important procedure in quantum system identification, calibration, and su...
We propose a variational quantum algorithm to study the real time dynamics of quantum systems as a g...
Given the recent developments in quantum techniques, modeling the physical Hamiltonian of a target q...
Identifying an accurate model for the dynamics of a quantum system is a vexing problem that underlie...
We propose an efficient quantum algorithm for simulating the dynamics of general Hamiltonian systems...