Add to ORKGWe investigate the quantum Cramer-Rao bounds on the joint multiple-parameter estimation with the Gaussian state as a probe. We derive the explicit right logarithmic derivative and symmetric logarithmic derivative operators in such a situation. We compute the corresponding quantum Fisher information matrices, and find that they can be fully expressed in terms of the mean displacement and covariance matrix of the Gaussian state. Finally, we give some examples to show the utility of our analytical results
We analyze the precision limits for a simultaneous estimation of a pair of conjugate parameters in a...
Gaussian states are of increasing interest in the estimation of physical parameters because they are...
We consider the problem of estimating the state of a large but nite number N of identical quantum sy...
We present a new proof of the quantum Cramer-Rao bound for precision parameter estimation and extend...
The aim of this thesis is to develop a theoretical framework to study parameter estimation of quantu...
For a fixed average energy, the simultaneous estimation of multiple phases can provide a better tota...
In this thesis we focus on Gaussian quantum metrology in the phase-space formalism and its applicati...
The main contribution of this paper is to derive an explicit expression for the fundamental precisio...
The quantum Cramer-Rao bound sets a fundamental limit on the accuracy of unbiased parameter estimati...
Quantum metrology holds the promise of an early practical application of quantum technologies, in wh...
We calculate the quantum Cramér-Rao bound for the sensitivity with which one or several parameters, ...
One of the fundamental tasks in quantum metrology is to estimate multiple parameters embedded in a n...
The Holevo Cramér-Rao bound is a lower bound on the sum of the mean-square error of estimates for pa...
Uncertainty relations in quantum mechanics express bounds on our ability to simultaneously obtain kn...
The estimation of more than one parameter in quantum mechanics is a fundamental problem with relevan...
We analyze the precision limits for a simultaneous estimation of a pair of conjugate parameters in a...
Gaussian states are of increasing interest in the estimation of physical parameters because they are...
We consider the problem of estimating the state of a large but nite number N of identical quantum sy...
We present a new proof of the quantum Cramer-Rao bound for precision parameter estimation and extend...
The aim of this thesis is to develop a theoretical framework to study parameter estimation of quantu...
For a fixed average energy, the simultaneous estimation of multiple phases can provide a better tota...
In this thesis we focus on Gaussian quantum metrology in the phase-space formalism and its applicati...
The main contribution of this paper is to derive an explicit expression for the fundamental precisio...
The quantum Cramer-Rao bound sets a fundamental limit on the accuracy of unbiased parameter estimati...
Quantum metrology holds the promise of an early practical application of quantum technologies, in wh...
We calculate the quantum Cramér-Rao bound for the sensitivity with which one or several parameters, ...
One of the fundamental tasks in quantum metrology is to estimate multiple parameters embedded in a n...
The Holevo Cramér-Rao bound is a lower bound on the sum of the mean-square error of estimates for pa...
Uncertainty relations in quantum mechanics express bounds on our ability to simultaneously obtain kn...
The estimation of more than one parameter in quantum mechanics is a fundamental problem with relevan...
We analyze the precision limits for a simultaneous estimation of a pair of conjugate parameters in a...
Gaussian states are of increasing interest in the estimation of physical parameters because they are...
We consider the problem of estimating the state of a large but nite number N of identical quantum sy...