We study the weak-convergence properties of random variables generated by unsharp quantum measurements. More precisely, for a sequence of random variables generated by repeated unsharp quantum measurements, we study the limit distribution of relative frequency. We provide a representation theorem for all separable states, showing that the distribution can be well approximated by a mixture of normal distributions. Furthermore, we investigate the convergence rates and show that the relative frequency can stabilize to some constant at best at the rate of order $1/\sqrt{N}$ for all separable inputs. On the other hand, we provide an example of a strictly unsharp quantum measurement where the better rates are achieved by using entangled inputs. T...
We address continuous weak linear quantum measurement and argue that it is best understood in terms ...
International audienceFor parameter estimation from an N-component composite quantum system, it is k...
Winters measurement compression theorem stands as one of the most penetrating insights of quantum in...
We show that quantum-to-classical channels, i.e., quantum measurements, can be asymptotically simula...
One is given n systems all prepared i.i.d. in some particular state chosen uniformly at random from ...
We study the properties of output distributions of noisy random circuits. We obtain upper and lower ...
We study the non-asymptotic fundamental limits for transmitting classical information over memoryles...
Abstract—We study the non-asymptotic fundamental limits for transmitting classical information over ...
We study the properties of output distributions of noisy, random circuits. We obtain upper and lower...
4 pages (revtex)Efficient methods for generating pseudo-randomly distributed unitary operators are n...
Quantum hypothesis testing is an important tool for quantum information processing. Two main strateg...
We address the statistics of continuous weak linear measurement on a few-state quantum system that i...
Open Quantum Random Walks, as developed in [2], are a quantum generalization of Markov chains on fin...
We address the statistics of a simultaneous continuous weak linear measurement of two noncommuting v...
When estimating an unknown single pure qubit state, the optimum fidelity is 2/3. As it is well known...
We address continuous weak linear quantum measurement and argue that it is best understood in terms ...
International audienceFor parameter estimation from an N-component composite quantum system, it is k...
Winters measurement compression theorem stands as one of the most penetrating insights of quantum in...
We show that quantum-to-classical channels, i.e., quantum measurements, can be asymptotically simula...
One is given n systems all prepared i.i.d. in some particular state chosen uniformly at random from ...
We study the properties of output distributions of noisy random circuits. We obtain upper and lower ...
We study the non-asymptotic fundamental limits for transmitting classical information over memoryles...
Abstract—We study the non-asymptotic fundamental limits for transmitting classical information over ...
We study the properties of output distributions of noisy, random circuits. We obtain upper and lower...
4 pages (revtex)Efficient methods for generating pseudo-randomly distributed unitary operators are n...
Quantum hypothesis testing is an important tool for quantum information processing. Two main strateg...
We address the statistics of continuous weak linear measurement on a few-state quantum system that i...
Open Quantum Random Walks, as developed in [2], are a quantum generalization of Markov chains on fin...
We address the statistics of a simultaneous continuous weak linear measurement of two noncommuting v...
When estimating an unknown single pure qubit state, the optimum fidelity is 2/3. As it is well known...
We address continuous weak linear quantum measurement and argue that it is best understood in terms ...
International audienceFor parameter estimation from an N-component composite quantum system, it is k...
Winters measurement compression theorem stands as one of the most penetrating insights of quantum in...