Add to ORKGQuantum process tomography is a powerful tool for understanding quantum channels and characterizing properties of quantum devices. Inspired by recent advances using classical shadows in quantum state tomography[1], we have developed ShadowQPT, a classical shadow method for quantum process tomography. We introduce two related formulations with and without ancilla qubits. ShadowQPT stochastically reconstructs the Choi matrix of the device allowing for an a-posteri classical evaluation of the device on arbitrary inputs with respect to arbitrary outputs. Using shadows we then show how to compute overlaps, generate all $k$-weight reduced processes, and perform reconstruction via Hamiltonian learning. These latter two tasks are efficient for larg...
Quantum process tomography is an experimental technique to fully characterize an unknown quantum pro...
We introduce a new approach to learn Hamiltonians through a resource that we call the pseudo-Choi st...
Multi-time quantum processes are endowed with the same richness as many-body physics, including temp...
We generalize the classical shadow tomography scheme to a broad class of finite-depth or finite-time...
Classical shadow tomography is a powerful randomized measurement protocol for predicting many proper...
Characterisation protocols have so far played a central role in the development of noisy intermediat...
With quantum computing devices increasing in scale and complexity, there is a growing need for tools...
With quantum computing devices increasing in scale and complexity, there is a growing need for tools...
We propose and investigate a new method of quantum process tomography (QPT) which we call projected ...
Properties of quantum systems can be estimated using classical shadows, which implement measurements...
We study classical shadows protocols based on randomized measurements in $n$-qubit entangled bases, ...
Learning dynamics from repeated observation of the time evolution of an open quantum system, namely,...
Non-Markovian noise poses a formidable challenge to the scalability of quantum devices, being both u...
The experimental implementation of selective quantum process tomography (SQPT) involves computing in...
Estimating expectation values is a key subroutine in many quantum algorithms. However, near-term imp...
Quantum process tomography is an experimental technique to fully characterize an unknown quantum pro...
We introduce a new approach to learn Hamiltonians through a resource that we call the pseudo-Choi st...
Multi-time quantum processes are endowed with the same richness as many-body physics, including temp...
We generalize the classical shadow tomography scheme to a broad class of finite-depth or finite-time...
Classical shadow tomography is a powerful randomized measurement protocol for predicting many proper...
Characterisation protocols have so far played a central role in the development of noisy intermediat...
With quantum computing devices increasing in scale and complexity, there is a growing need for tools...
With quantum computing devices increasing in scale and complexity, there is a growing need for tools...
We propose and investigate a new method of quantum process tomography (QPT) which we call projected ...
Properties of quantum systems can be estimated using classical shadows, which implement measurements...
We study classical shadows protocols based on randomized measurements in $n$-qubit entangled bases, ...
Learning dynamics from repeated observation of the time evolution of an open quantum system, namely,...
Non-Markovian noise poses a formidable challenge to the scalability of quantum devices, being both u...
The experimental implementation of selective quantum process tomography (SQPT) involves computing in...
Estimating expectation values is a key subroutine in many quantum algorithms. However, near-term imp...
Quantum process tomography is an experimental technique to fully characterize an unknown quantum pro...
We introduce a new approach to learn Hamiltonians through a resource that we call the pseudo-Choi st...
Multi-time quantum processes are endowed with the same richness as many-body physics, including temp...