Add to ORKGIn this project, quantum cloning machines are analyzed that take in N quantum systems in the same unknown pure state and output M quantum systems with M > N, such that the output best resembles the ideal, but impossible output of an M-fold tensor product of the pure input state. The proof of Keyl and Werner is reviewed in which a unique optimal solution is constructed, both in the case where the quality of the cloning is determined by the entire output, and in the case where the quality is determined by measurements on a single clone. Furthermore, it is shown that previous work on qubit cloning machines is a special case of the presented optimal solution
The no-cloning theorem is one of the fundamental concepts of quantum information theory. It tells us...
An optimal universal cloning transformation is derived that produces M copies of an unknown qubit fr...
Optimal quantum cloning is the process of making one or more copies of an arbitrary unknown input qu...
We study quantum cloning machines (QCM) that act on an unknown N-level quantum state and make M copi...
The impossibility of perfectly copying (or cloning) an unknown quantum state is one of the basic rul...
We pose the question whether the asymptotic equivalence between quantum cloning and quantum state es...
The impossibility of perfectly copying or cloning an unknown quantum state is one of the basic rule...
We derive a tight upper bound for the fidelity of a universal N → M qubit cloner, valid for any M ≥ ...
We derive a tight upper bound for the fidelity of a universal N to M qubit cloner, valid for any M \...
We establish the best possible approximation to a perfect quantum cloning machine that produces two ...
A quantum cloning machine is introduced that yields M identical optimal clones from N replicas of a ...
We establish the best possible approximation to a perfect quantum cloning machine which produces two...
The cloning of conjugate continuous quantum variables is analyzed based on the concept of Gaussian c...
The no-cloning theorem is one of the fundamental concepts of quantum information theory. It tells us...
The no-cloning theorem is one of the fundamental concepts of quantum information theory. It tells us...
The no-cloning theorem is one of the fundamental concepts of quantum information theory. It tells us...
An optimal universal cloning transformation is derived that produces M copies of an unknown qubit fr...
Optimal quantum cloning is the process of making one or more copies of an arbitrary unknown input qu...
We study quantum cloning machines (QCM) that act on an unknown N-level quantum state and make M copi...
The impossibility of perfectly copying (or cloning) an unknown quantum state is one of the basic rul...
We pose the question whether the asymptotic equivalence between quantum cloning and quantum state es...
The impossibility of perfectly copying or cloning an unknown quantum state is one of the basic rule...
We derive a tight upper bound for the fidelity of a universal N → M qubit cloner, valid for any M ≥ ...
We derive a tight upper bound for the fidelity of a universal N to M qubit cloner, valid for any M \...
We establish the best possible approximation to a perfect quantum cloning machine that produces two ...
A quantum cloning machine is introduced that yields M identical optimal clones from N replicas of a ...
We establish the best possible approximation to a perfect quantum cloning machine which produces two...
The cloning of conjugate continuous quantum variables is analyzed based on the concept of Gaussian c...
The no-cloning theorem is one of the fundamental concepts of quantum information theory. It tells us...
The no-cloning theorem is one of the fundamental concepts of quantum information theory. It tells us...
The no-cloning theorem is one of the fundamental concepts of quantum information theory. It tells us...
An optimal universal cloning transformation is derived that produces M copies of an unknown qubit fr...
Optimal quantum cloning is the process of making one or more copies of an arbitrary unknown input qu...