In the simple quantum hypothesis testing problem, upper bounds on the error probabilities are shown based on a key operator inequality between a density operator and its pinching. Concerning the error exponents, the upper bounds lead to a noncommutative analogue of the Hoeffding bound, which is identical with the classical counter part if the hypotheses, composed of two density operators, are mutually commutative. The upper bounds also provide a simple proof of the direct part of the quantum Stein's lemma
A fundamental quantity of interest in Shannon theory, classical or quantum, is the optimal error exp...
We review the use of binary hypothesis testing for the derivation of the sphere packing bound in cha...
We study the discrimination of a pair of orthogonal quantum states in the many-copy setting. This is...
In the simple quantum hypothesis testing problem, upper bound with asymmetric setting is shown by us...
In this paper, we give another proof of quantum Stein's lemma by calculating the information spectru...
Given many independent and identically-distributed (i.i.d.) copies of a quantum system described eit...
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...
We consider symmetric hypothesis testing, where the hypotheses are allowed to be arbitrary density o...
We consider the problem of discriminating between two different states of a finite quantum system in...
We introduce a new quantum decoder based on a variant of the pretty good measurement, but defined vi...
We extend quantum Stein’s lemma in asymmetric quantum hypothesis testing to composite null and alter...
We use the smooth entropy approach to treat the problems of binary quantum hypothesis testing and th...
We study the discrimination of a pair of orthogonal quantum states in the many-copy setting. This is...
We study a variant of quantum hypothesis testing wherein an additional 'inconclusive' measurement ou...
A fundamental quantity of interest in Shannon theory, classical or quantum, is the optimal error exp...
We review the use of binary hypothesis testing for the derivation of the sphere packing bound in cha...
We study the discrimination of a pair of orthogonal quantum states in the many-copy setting. This is...
In the simple quantum hypothesis testing problem, upper bound with asymmetric setting is shown by us...
In this paper, we give another proof of quantum Stein's lemma by calculating the information spectru...
Given many independent and identically-distributed (i.i.d.) copies of a quantum system described eit...
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...
We consider symmetric hypothesis testing, where the hypotheses are allowed to be arbitrary density o...
We consider the problem of discriminating between two different states of a finite quantum system in...
We introduce a new quantum decoder based on a variant of the pretty good measurement, but defined vi...
We extend quantum Stein’s lemma in asymmetric quantum hypothesis testing to composite null and alter...
We use the smooth entropy approach to treat the problems of binary quantum hypothesis testing and th...
We study the discrimination of a pair of orthogonal quantum states in the many-copy setting. This is...
We study a variant of quantum hypothesis testing wherein an additional 'inconclusive' measurement ou...
A fundamental quantity of interest in Shannon theory, classical or quantum, is the optimal error exp...
We review the use of binary hypothesis testing for the derivation of the sphere packing bound in cha...
We study the discrimination of a pair of orthogonal quantum states in the many-copy setting. This is...