We show that when a suitable entanglement-generating unitary operator depending on a parameter is applied on N qubits in parallel, a precision of the order of 2−N in estimating the parameter may be achieved. This exponentially improves the precision achievable in classical and in quantum nonentangling strategies
The simultaneous quantum estimation of multiple parameters can provide a better precision than estim...
Experimental characterizations of a quantum system involve the measurement of expectation values of ...
Quantum metrology enhances measurement precision by utilising the properties of quantum physics. In ...
We show that when a suitable entanglement generating unitary operator depending on a parameter is ap...
Quantum metrology aims to exploit quantum phenomena to overcome classical limitations in the estimat...
We consider quantum metrology with several copies of bipartite and multipartite quantum states. We c...
One of the main quests in quantum metrology is to attain the ultimate precision limit with given res...
Entanglement is generally considered necessary for achieving the Heisenberg limit in quantum metrolo...
We give a simple intuition for why and when entanglement is needed for quantum-enhanced precision me...
In classical estimation theory, the central limit theorem implies that the statistical error in a me...
Quantum metrology shows that by exploiting nonclassical resources it is possible to overcome the fun...
We derive new bounds on achievable precision in the most general adaptive quantum metrological scena...
Entanglement enhanced quantum metrology has been well investigated for beating the standard quantum ...
With the advance of quantum information technology, the question of how to most efficiently test qua...
We point out a general framework that encompasses most cases in which quantum effects enable an incr...
The simultaneous quantum estimation of multiple parameters can provide a better precision than estim...
Experimental characterizations of a quantum system involve the measurement of expectation values of ...
Quantum metrology enhances measurement precision by utilising the properties of quantum physics. In ...
We show that when a suitable entanglement generating unitary operator depending on a parameter is ap...
Quantum metrology aims to exploit quantum phenomena to overcome classical limitations in the estimat...
We consider quantum metrology with several copies of bipartite and multipartite quantum states. We c...
One of the main quests in quantum metrology is to attain the ultimate precision limit with given res...
Entanglement is generally considered necessary for achieving the Heisenberg limit in quantum metrolo...
We give a simple intuition for why and when entanglement is needed for quantum-enhanced precision me...
In classical estimation theory, the central limit theorem implies that the statistical error in a me...
Quantum metrology shows that by exploiting nonclassical resources it is possible to overcome the fun...
We derive new bounds on achievable precision in the most general adaptive quantum metrological scena...
Entanglement enhanced quantum metrology has been well investigated for beating the standard quantum ...
With the advance of quantum information technology, the question of how to most efficiently test qua...
We point out a general framework that encompasses most cases in which quantum effects enable an incr...
The simultaneous quantum estimation of multiple parameters can provide a better precision than estim...
Experimental characterizations of a quantum system involve the measurement of expectation values of ...
Quantum metrology enhances measurement precision by utilising the properties of quantum physics. In ...