Add to ORKGWe provide a rate distortion interpretation of the problem of quantum data compression of ensembles of mixed states with commuting density operators. There are two versions of this problem. In the visible case the sequence of states is available to the encoder and in the blind or hidden case the encoder may access only a sequence of measurements. We find the exact optimal compression rates for both the visible and hidden cases. Our analysis includes the scenario in which asymptotic reconstruction is imperfect
Winters measurement compression theorem stands as one of the most penetrating insights of quantum in...
The problem of distributed compression for correlated quantum sources is considered. The classical v...
We consider a natural distortion measure based on entanglement fidelity and find the exact rate-dist...
We analyze the problem of quantum data compression of commuting density operators in the visible cas...
We present a formula that determines the optimal number of qubits per message that allows asymptotic...
We consider the problem of the optimal compression rate in the case of the source producing mixed si...
A classical random variable can be faithfully compressed into a sequence of bits with its expected l...
IEEE We study the compression of n quantum systems, each prepared in the same state belonging to a g...
Th1-8: Quantum IT 4We study the compression of arbitrary parametric families of n identically prepar...
We provide a framework for one-shot quantum rate distortion coding, in which the goal is to determin...
© 2015 IEEE. We study classical source coding with quantum side-information where the quantum side-i...
The information spectrum approach gives general formulae for optimal rates of various information th...
© 2016 IEEE. Coded source compression, also known as source compression with helpers, has been a maj...
IEEE Rate-distortion theory provides bounds for compressing data produced by an information source t...
We prove a theorem for coding mixed-state quantum signals. For a class of coding schemes, the von Ne...
Winters measurement compression theorem stands as one of the most penetrating insights of quantum in...
The problem of distributed compression for correlated quantum sources is considered. The classical v...
We consider a natural distortion measure based on entanglement fidelity and find the exact rate-dist...
We analyze the problem of quantum data compression of commuting density operators in the visible cas...
We present a formula that determines the optimal number of qubits per message that allows asymptotic...
We consider the problem of the optimal compression rate in the case of the source producing mixed si...
A classical random variable can be faithfully compressed into a sequence of bits with its expected l...
IEEE We study the compression of n quantum systems, each prepared in the same state belonging to a g...
Th1-8: Quantum IT 4We study the compression of arbitrary parametric families of n identically prepar...
We provide a framework for one-shot quantum rate distortion coding, in which the goal is to determin...
© 2015 IEEE. We study classical source coding with quantum side-information where the quantum side-i...
The information spectrum approach gives general formulae for optimal rates of various information th...
© 2016 IEEE. Coded source compression, also known as source compression with helpers, has been a maj...
IEEE Rate-distortion theory provides bounds for compressing data produced by an information source t...
We prove a theorem for coding mixed-state quantum signals. For a class of coding schemes, the von Ne...
Winters measurement compression theorem stands as one of the most penetrating insights of quantum in...
The problem of distributed compression for correlated quantum sources is considered. The classical v...
We consider a natural distortion measure based on entanglement fidelity and find the exact rate-dist...