Add to ORKGThe central issue in this article is to transmit a quantum state in such a way that after some decoherence occurs, most of the information can be restored by a suitable decoding operation. For this purpose, we incorporate redundancy by mapping a given initial quantum state to a messenger state on a larger-dimensional Hilbert space via a $C^*$-algebra embedding. Our noise model for the transmission is a phase damping channel which admits a noiseless or decoherence-free subspace or subsystem. More precisely, the transmission channel is obtained from convex combinations of a set of lowest rank yes/no measurements that leave a component of the messenger state unchanged. The objective of our encoding is to distribute quantum information optimall...
The more than thirty years old issue of the information capacity of quantum communication channels w...
We revisit a fundamental open problem in quantum information theory, namely whether it is possible t...
© 2018 American Physical Society. Encoding schemes and error-correcting codes are widely used in inf...
An upper limit is given to the amount of quantum information that can be transmitted reliably down a...
We prove the weak converse coding theorems for the quantum source and channel. Our results give the ...
We show that the amount of coherent quantum information that can be reliably transmitted down a deph...
We give a proof that the coherent information is an achievable rate for the transmission of quantum ...
We consider the problem of optimally decoding a quantum error correction code -- that is to find the...
Noise is the main obstacle for the realization of fault-tolerant quantum information processing and ...
We show that the amount of quantum information that can be reliably transmitted down a dephasing cha...
Most coding theorems in quantum Shannon theory can be proven using the decoupling technique. To send...
Designing encoding and decoding circuits to reliably send messages over many uses of a noisy channel...
We present optimal encoding-decoding procedures for sending the information contained in an arbitrar...
A model of quantum noisy channel with input encoding by a classical random vector is described. An e...
Quantum information theory studies the fundamental limits that physical laws impose on information p...
The more than thirty years old issue of the information capacity of quantum communication channels w...
We revisit a fundamental open problem in quantum information theory, namely whether it is possible t...
© 2018 American Physical Society. Encoding schemes and error-correcting codes are widely used in inf...
An upper limit is given to the amount of quantum information that can be transmitted reliably down a...
We prove the weak converse coding theorems for the quantum source and channel. Our results give the ...
We show that the amount of coherent quantum information that can be reliably transmitted down a deph...
We give a proof that the coherent information is an achievable rate for the transmission of quantum ...
We consider the problem of optimally decoding a quantum error correction code -- that is to find the...
Noise is the main obstacle for the realization of fault-tolerant quantum information processing and ...
We show that the amount of quantum information that can be reliably transmitted down a dephasing cha...
Most coding theorems in quantum Shannon theory can be proven using the decoupling technique. To send...
Designing encoding and decoding circuits to reliably send messages over many uses of a noisy channel...
We present optimal encoding-decoding procedures for sending the information contained in an arbitrar...
A model of quantum noisy channel with input encoding by a classical random vector is described. An e...
Quantum information theory studies the fundamental limits that physical laws impose on information p...
The more than thirty years old issue of the information capacity of quantum communication channels w...
We revisit a fundamental open problem in quantum information theory, namely whether it is possible t...
© 2018 American Physical Society. Encoding schemes and error-correcting codes are widely used in inf...