We extend quantum Stein’s lemma in asymmetric quantum hypothesis testing to composite null and alternative hypotheses. As our main result, we show that the asymptotic error exponent for testing convex combinations of quantum states ρ⊗n against convex combinations of quantum states σ⊗n can be written as a regularized quantum relative entropy formula. We prove that in general such a regularization is needed but also discuss various settings where our formula as well as extensions thereof become single-letter. This includes an operational interpretation of the relative entropy of coherence in terms of hypothesis testing. For our proof, we start from the composite Stein’s lemma for classical probability distributions and lift the result to the ...
© 1963-2012 IEEE. We revisit the problem of asymmetric binary hypothesis testing against a composite...
Distance measures between quantum states like the trace distance and the fidelity can naturally be d...
We consider the problem of discriminating between two different states of a finite quantum system in...
We extend quantum Stein's lemma in asymmetric quantum hypothesis testing to composite null and alter...
Given many independent and identically-distributed (i.i.d.) copies of a quantum system described eit...
We study a variant of quantum hypothesis testing wherein an additional 'inconclusive' measurement ou...
A variety of new measures of quantum R�nyi mutual information and quantum R�nyi conditional entr...
We use the smooth entropy approach to treat the problems of binary quantum hypothesis testing and th...
In the simple quantum hypothesis testing problem, upper bounds on the error probabilities are shown ...
We consider the problem of discriminating between two different states of a finite quantum system in...
In the simple quantum hypothesis testing problem, upper bound with asymmetric setting is shown by us...
Pairs of states, or "boxes" are the basic objects in the resource theory of asymmetric distinguishab...
Quantum relative entropy D(ρ‖σ) = Tr(ρ(log ρ − log σ)) • significance in asymptotic hypothesis test...
This paper studies the difficulty of discriminating between an arbitrary quantum channel and a “repl...
In this paper, we give another proof of quantum Stein's lemma by calculating the information spectru...
© 1963-2012 IEEE. We revisit the problem of asymmetric binary hypothesis testing against a composite...
Distance measures between quantum states like the trace distance and the fidelity can naturally be d...
We consider the problem of discriminating between two different states of a finite quantum system in...
We extend quantum Stein's lemma in asymmetric quantum hypothesis testing to composite null and alter...
Given many independent and identically-distributed (i.i.d.) copies of a quantum system described eit...
We study a variant of quantum hypothesis testing wherein an additional 'inconclusive' measurement ou...
A variety of new measures of quantum R�nyi mutual information and quantum R�nyi conditional entr...
We use the smooth entropy approach to treat the problems of binary quantum hypothesis testing and th...
In the simple quantum hypothesis testing problem, upper bounds on the error probabilities are shown ...
We consider the problem of discriminating between two different states of a finite quantum system in...
In the simple quantum hypothesis testing problem, upper bound with asymmetric setting is shown by us...
Pairs of states, or "boxes" are the basic objects in the resource theory of asymmetric distinguishab...
Quantum relative entropy D(ρ‖σ) = Tr(ρ(log ρ − log σ)) • significance in asymptotic hypothesis test...
This paper studies the difficulty of discriminating between an arbitrary quantum channel and a “repl...
In this paper, we give another proof of quantum Stein's lemma by calculating the information spectru...
© 1963-2012 IEEE. We revisit the problem of asymmetric binary hypothesis testing against a composite...
Distance measures between quantum states like the trace distance and the fidelity can naturally be d...
We consider the problem of discriminating between two different states of a finite quantum system in...