The general class of Gaussian Schmidt-number witness operators for bipartite systems is studied. It is shown that any member of this class is reducible to a convex combination of two types of Gaussian operators using local operations and classical communications. This gives rise to a simple operational method, which is solely based on measurable covariance matrices of quantum states. Our method bridges the gap between theory and experiment of entanglement quantification. In particular, we certify lower bounds of the Schmidt number of squeezed thermal and phase-randomized squeezed vacuum states as examples of Gaussian and non-Gaussian quantum states, respectively
Gaussian states are the backbone of quantum information protocols with continuous-variable systems w...
This thesis presents an investigation into the generation and characterisation of non-Gaussian state...
We establish fundamental upper bounds on the amount of secret key that can be extracted from quantum...
We apply the generalised concept of witness operators to arbitrary convex sets, and review the crite...
A measure of nonclassicality N in terms of local Gaussian unitary operations for bipartite Gau...
Gaussian bipartite states are basic tools for the realization of quantum information protocols with ...
In recent years the paradigm based on entanglement as the unique measure of quantum correlations has...
We investigate the action of local unitary operations on multimode (pure or mixed) Gaussian states a...
We introduce an operational discord-type measure for quantifying nonclassical correlations in bipart...
We present a novel approach to the problem of separability versus entanglement in Gaussian quantum s...
We review the theory of continuous-variable entanglement with special emphasis on foundational aspec...
The Schmidt number of a mixed state characterizes the minimum Schmidt rank of the pure states needed...
Robustness measures as introduced by Vidal and Tarrach [PRA, 59, 141-155] quantify the extent to whi...
We characterize the class of all physical operations that transform Gaussian states to Gaussian stat...
We address the quantification of non-Gaussianity of states and operations in continuous-variable sys...
Gaussian states are the backbone of quantum information protocols with continuous-variable systems w...
This thesis presents an investigation into the generation and characterisation of non-Gaussian state...
We establish fundamental upper bounds on the amount of secret key that can be extracted from quantum...
We apply the generalised concept of witness operators to arbitrary convex sets, and review the crite...
A measure of nonclassicality N in terms of local Gaussian unitary operations for bipartite Gau...
Gaussian bipartite states are basic tools for the realization of quantum information protocols with ...
In recent years the paradigm based on entanglement as the unique measure of quantum correlations has...
We investigate the action of local unitary operations on multimode (pure or mixed) Gaussian states a...
We introduce an operational discord-type measure for quantifying nonclassical correlations in bipart...
We present a novel approach to the problem of separability versus entanglement in Gaussian quantum s...
We review the theory of continuous-variable entanglement with special emphasis on foundational aspec...
The Schmidt number of a mixed state characterizes the minimum Schmidt rank of the pure states needed...
Robustness measures as introduced by Vidal and Tarrach [PRA, 59, 141-155] quantify the extent to whi...
We characterize the class of all physical operations that transform Gaussian states to Gaussian stat...
We address the quantification of non-Gaussianity of states and operations in continuous-variable sys...
Gaussian states are the backbone of quantum information protocols with continuous-variable systems w...
This thesis presents an investigation into the generation and characterisation of non-Gaussian state...
We establish fundamental upper bounds on the amount of secret key that can be extracted from quantum...