The long-standing conjectures of the optimality of Gaussian inputs for Gaussian channel and Gaussian additivity are solved for a broad class of covariant or contravariant Bosonic Gaussian channels (which includes in particular thermal, additive classical noise, and amplifier channels) restricting to the class of states with finite second moments. We show that the vacuum is the input state which minimizes the entropy at the output of such channels. This allows us to show also that the classical capacity of these channels (under the input energy constraint) is additive and is achieved by Gaussian encodings
A formulation of the generalized minimal output entropy conjecture for Gaussian channels is presente...
A long-standing open problem in quantum information theory is to find the classical capacity of an o...
A general quantum channel can be represented in terms of a unitary interaction between the informati...
The long-standing conjectures of the optimality of Gaussian inputs for Gaussian channel and Gaussian...
The classical capacity of quantum channels is the tight upper bound for the transmission rate of cla...
We prove the long-standing conjecture stating that Gaussian thermal input states minimize the output...
We present an algorithm for calculation of the Gaussian classical capacity of a quantum bosonic memo...
PACS 03.67.Hk, 89.70.Kn The classical capacity of quantum channels is the tight upper bound for the ...
In this thesis we study the information transmission through Gaussian quantum channels. Gaussian qua...
We survey the state of the art for the proof of the quantum Gaussian optimizer conjectures of quantu...
Optical channels, such as fibers or free-space links, are ubiquitous in today's telecommunication n...
The Amosov-Holevo-Werner conjecture implies the additivity of the minimum Re'nyi entropies at the ou...
We address the classical capacity of a quantum bosonic memory channel with additive noise, subject t...
We determine the minimum Wehrl entropy among the quantum states with a given von Neumann entropy and...
The set of quantum Gaussian channels acting on one bosonic mode can be classified according to the a...
A formulation of the generalized minimal output entropy conjecture for Gaussian channels is presente...
A long-standing open problem in quantum information theory is to find the classical capacity of an o...
A general quantum channel can be represented in terms of a unitary interaction between the informati...
The long-standing conjectures of the optimality of Gaussian inputs for Gaussian channel and Gaussian...
The classical capacity of quantum channels is the tight upper bound for the transmission rate of cla...
We prove the long-standing conjecture stating that Gaussian thermal input states minimize the output...
We present an algorithm for calculation of the Gaussian classical capacity of a quantum bosonic memo...
PACS 03.67.Hk, 89.70.Kn The classical capacity of quantum channels is the tight upper bound for the ...
In this thesis we study the information transmission through Gaussian quantum channels. Gaussian qua...
We survey the state of the art for the proof of the quantum Gaussian optimizer conjectures of quantu...
Optical channels, such as fibers or free-space links, are ubiquitous in today's telecommunication n...
The Amosov-Holevo-Werner conjecture implies the additivity of the minimum Re'nyi entropies at the ou...
We address the classical capacity of a quantum bosonic memory channel with additive noise, subject t...
We determine the minimum Wehrl entropy among the quantum states with a given von Neumann entropy and...
The set of quantum Gaussian channels acting on one bosonic mode can be classified according to the a...
A formulation of the generalized minimal output entropy conjecture for Gaussian channels is presente...
A long-standing open problem in quantum information theory is to find the classical capacity of an o...
A general quantum channel can be represented in terms of a unitary interaction between the informati...