Add to ORKGMajorization uncertainty relations are generalized for an arbitrary mixed quantum state ρ of a finite size N . In particular, a lower bound for the sum of two entropies characterizing the probability distributions corresponding to measurements with respect to two arbitrary orthogonal bases is derived in terms of the spectrum of ρ and the entries of a unitary matrix U relating both bases. The results obtained can also be formulated for two measurements performed on a single subsystem of a bipartite system described by a pure state, and consequently expressed as an uncertainty relation for the sum of conditional entropies
We analyze entropic uncertainty relations for two orthogonal measurements on a N-dimensional Hilbert...
As a very fundamental principle in quantum physics, uncertainty principle has been studied intensive...
Constructive techniques to establish state-independent uncertainty relations for the sum of variance...
Majorization uncertainty relations are generalized for an arbitrary mixed quantum state $\rho$ of a ...
Entropic uncertainty relations in a finite-dimensional Hilbert space are investigated. Making use of...
We analyze entropic uncertainty relations in a finite-dimensional Hilbert space and derive several s...
Entropic uncertainty relations in a finite-dimensional Hilbert space are investigated. Making use of...
We give a review of different forms of uncertainty relations for mixed quantum states obtained over ...
Uncertainty principle, which was first introduced by Werner Heisenberg in 1927, forms a fundamental ...
We compute Renyi entropies for the statistics of a noisy simultaneous observation of two complementa...
We formulate uncertainty relations for mutually unbiased bases and symmetric informational...
We introduce a new information-theoretic formulation of quantum measurement uncertainty relations, b...
The entropic uncertainty relations are a very active field of scientific inquiry. Their applications...
The emergence of a minimal length at the Planck scale is consistent with modern developments in quan...
The average of the skew information over the observables was proposed by Luo as a quantum ...
We analyze entropic uncertainty relations for two orthogonal measurements on a N-dimensional Hilbert...
As a very fundamental principle in quantum physics, uncertainty principle has been studied intensive...
Constructive techniques to establish state-independent uncertainty relations for the sum of variance...
Majorization uncertainty relations are generalized for an arbitrary mixed quantum state $\rho$ of a ...
Entropic uncertainty relations in a finite-dimensional Hilbert space are investigated. Making use of...
We analyze entropic uncertainty relations in a finite-dimensional Hilbert space and derive several s...
Entropic uncertainty relations in a finite-dimensional Hilbert space are investigated. Making use of...
We give a review of different forms of uncertainty relations for mixed quantum states obtained over ...
Uncertainty principle, which was first introduced by Werner Heisenberg in 1927, forms a fundamental ...
We compute Renyi entropies for the statistics of a noisy simultaneous observation of two complementa...
We formulate uncertainty relations for mutually unbiased bases and symmetric informational...
We introduce a new information-theoretic formulation of quantum measurement uncertainty relations, b...
The entropic uncertainty relations are a very active field of scientific inquiry. Their applications...
The emergence of a minimal length at the Planck scale is consistent with modern developments in quan...
The average of the skew information over the observables was proposed by Luo as a quantum ...
We analyze entropic uncertainty relations for two orthogonal measurements on a N-dimensional Hilbert...
As a very fundamental principle in quantum physics, uncertainty principle has been studied intensive...
Constructive techniques to establish state-independent uncertainty relations for the sum of variance...