Quantifying quantum mechanical uncertainty is vital for the increasing number of experiments that reach the uncertainty limited regime. We present a method for computing tight variance uncertainty relations, i.e., the optimal state-independent lower bound for the sum of the variances for any set of two or more measurements. The bounds come with a guaranteed error estimate, so results of preassigned accuracy can be obtained straightforwardly. Our method also works for postive-operator-valued measurements. Therefore, it can be used for detecting entanglement in noisy environments, even in cases where conventional spin squeezing criteria fail because of detector noise
We show that entanglement of pure multiparty states can be quantified by means of quantum uncertaint...
We formulate an entanglement criterion using Peres-Horodecki positive partial transpose operations c...
Heisenberg's uncertainty principle implies that if one party (Alice) prepares a system and randomly ...
The standard state-dependent Heisenberg-Robertson uncertainty-relation lower bound fails to capture ...
We present the generalized state-dependent entropic uncertainty relations for multiple measurement s...
Uncertainty principle, which was first introduced by Werner Heisenberg in 1927, forms a fundamental ...
In this work we study various notions of uncertainty for angular momentum in the spin-s representati...
The well-known Robertson–Schrödinger uncertainty relations have state-dependent lower bounds, which ...
We investigate entropic uncertainty relations for two or more binary measurements, for example, spin...
Constructive techniques to establish state-independent uncertainty relations for the sum of variance...
How much of the uncertainty in predicting measurement outcomes for noncommuting quantum observables ...
Uncertainty relations give upper bounds on the accuracy by which the outcomes of two incompatible me...
As a very fundamental principle in quantum physics, uncertainty principle has been studied intensive...
Entanglement measures quantify nonclassical correlations present in a quantum system, but can be ext...
We present a significantly improved scheme of entanglement detection through local uncertainty relat...
We show that entanglement of pure multiparty states can be quantified by means of quantum uncertaint...
We formulate an entanglement criterion using Peres-Horodecki positive partial transpose operations c...
Heisenberg's uncertainty principle implies that if one party (Alice) prepares a system and randomly ...
The standard state-dependent Heisenberg-Robertson uncertainty-relation lower bound fails to capture ...
We present the generalized state-dependent entropic uncertainty relations for multiple measurement s...
Uncertainty principle, which was first introduced by Werner Heisenberg in 1927, forms a fundamental ...
In this work we study various notions of uncertainty for angular momentum in the spin-s representati...
The well-known Robertson–Schrödinger uncertainty relations have state-dependent lower bounds, which ...
We investigate entropic uncertainty relations for two or more binary measurements, for example, spin...
Constructive techniques to establish state-independent uncertainty relations for the sum of variance...
How much of the uncertainty in predicting measurement outcomes for noncommuting quantum observables ...
Uncertainty relations give upper bounds on the accuracy by which the outcomes of two incompatible me...
As a very fundamental principle in quantum physics, uncertainty principle has been studied intensive...
Entanglement measures quantify nonclassical correlations present in a quantum system, but can be ext...
We present a significantly improved scheme of entanglement detection through local uncertainty relat...
We show that entanglement of pure multiparty states can be quantified by means of quantum uncertaint...
We formulate an entanglement criterion using Peres-Horodecki positive partial transpose operations c...
Heisenberg's uncertainty principle implies that if one party (Alice) prepares a system and randomly ...