Title :
Strong converse for identification via quantum channels
Author :
Ahlswede, Rudolf ; Winter, Andreas
Author_Institution :
Fak. fur Math., Bielefeld Univ., Germany
fDate :
3/1/2002 12:00:00 AM
Abstract :
We present a simple proof of the strong converse for identification via discrete memoryless quantum channels, based on a novel covering lemma. The new method is a generalization to quantum communication channels of Ahlswede´s (1979, 1992) approach to classical channels. It involves a development of explicit large deviation estimates to the case of random variables taking values in self-adjoint operators on a Hilbert space. This theory is presented separately in an appendix, and we illustrate it by showing its application to quantum generalizations of classical hypergraph covering problems
Keywords :
graph theory; identification; memoryless systems; quantum communication; random processes; telecommunication channels; Hilbert space; classical channels; covering lemma; discrete memoryless quantum channels; explicit large deviation estimates; hypergraph covering problems; quantum channels identification; quantum communication channels; random variables; self-adjoint operators; strong converse; Channel capacity; Communication channels; Computer science; Hilbert space; Information theory; Memoryless systems; Mutual information; Quantum mechanics; Random variables; Statistics;
Journal_Title :
Information Theory, IEEE Transactions on
