Add to ORKGIn this thesis, I reflect on quantum instruments that measure the state of pure finite dimensional quantum systems. As the Heisenberg principle dictates, there exists a joint restriction to the information gain and distortion by measurement of a quantum system. I minimize the distortion of measurement and maximize the quality of the outcome by finding the optimal (covariant) instrument. In order to optimize this joint restriction, the family of covariant instruments is classified. This is an important side result
This paper concerns the design problem of choosing the measurement that provides the maximum Fisher ...
We address the problem of the information-disturbance tradeoff associated to the estimation of a qua...
Given only a finite ensemble of identically prepared particles, how precisely can one determine thei...
This thesis addresses the problem of developing a quantum counter-part of the well established class...
This paper concerns the design problem of choosing the measurement that provides the maximum Fisher ...
We present a simple information-disturbance tradeoff relation valid for any general measurement appa...
The class of measurements of covariant parameters were derived that are optimal according to the max...
We address the problem of the information-disturbance tradeoff associated to the estimation of a qua...
We address the information–disturbance tradeoff for state measurements on continuous variable Gaussi...
We discuss symmetric quantum measurements and the associated covariant observables modelled, respect...
We present optimal and minimal measurements on identical copies of an unknown state of a quantum bit...
We address the trade-off between information gain and state disturbance in measurement performed on ...
Quantum metrology promises improved sensitivity in parameter estimation over classical procedures. H...
Optimal control theory is an effective tool to improve parameter estimation of quantum systems. Dif...
Quantum metrology promises improved sensitivity in parameter estimation over classical procedures. H...
This paper concerns the design problem of choosing the measurement that provides the maximum Fisher ...
We address the problem of the information-disturbance tradeoff associated to the estimation of a qua...
Given only a finite ensemble of identically prepared particles, how precisely can one determine thei...
This thesis addresses the problem of developing a quantum counter-part of the well established class...
This paper concerns the design problem of choosing the measurement that provides the maximum Fisher ...
We present a simple information-disturbance tradeoff relation valid for any general measurement appa...
The class of measurements of covariant parameters were derived that are optimal according to the max...
We address the problem of the information-disturbance tradeoff associated to the estimation of a qua...
We address the information–disturbance tradeoff for state measurements on continuous variable Gaussi...
We discuss symmetric quantum measurements and the associated covariant observables modelled, respect...
We present optimal and minimal measurements on identical copies of an unknown state of a quantum bit...
We address the trade-off between information gain and state disturbance in measurement performed on ...
Quantum metrology promises improved sensitivity in parameter estimation over classical procedures. H...
Optimal control theory is an effective tool to improve parameter estimation of quantum systems. Dif...
Quantum metrology promises improved sensitivity in parameter estimation over classical procedures. H...
This paper concerns the design problem of choosing the measurement that provides the maximum Fisher ...
We address the problem of the information-disturbance tradeoff associated to the estimation of a qua...
Given only a finite ensemble of identically prepared particles, how precisely can one determine thei...