We study quantum dichotomies and the resource theory of asymmetric distinguishability using a generalization of Strassen's theorem on preordered semirings. We find that an asymptotic variant of relative submajorization, defined on unnormalized dichotomies, is characterized by real-valued monotones that are multiplicative under the tensor product and additive under the direct sum. These strong constraints allow us to classify and explicitly describe all such monotones, leading to a rate formula expressed as an optimization involving sandwiched Rényi divergences. As an application we give a new derivation of the strong converse error exponent in quantum hypothesis testing
The Schnorr-Stimm dichotomy theorem [31] concerns finite-state gamblers that bet on infinite sequenc...
The Schnorr-Stimm dichotomy theorem [Schnorr and Stimm, 1972] concerns finite-state gamblers that be...
We construct a family of additive entanglement measures for pure multipartite states. The family is ...
Pairs of states, or "boxes" are the basic objects in the resource theory of asymmetric distinguishab...
Understanding the properties of objects under a natural product operation is a central theme in math...
Given a commutative semiring with a compatible preorder satisfying a version of the Archimedean prop...
Purely multiplicative comparisons of quantum relative entropy are desirable but challenging to prove...
We systematically develop the resource theory of asymmetric distinguishability, as initiated roughly...
We show that the maximum fidelity obtained by a positive partial transpose (p.p.t.) distillation pro...
We study quantum versions of the Shannon capacity of graphs and non-commutative graphs. We introduce...
We extend quantum Stein’s lemma in asymmetric quantum hypothesis testing to composite null and alter...
In this article, we introduce the notion of near semiring with involution. Generalizing the theory o...
In the simple quantum hypothesis testing problem, upper bound with asymmetric setting is shown by us...
Funder: Cambridge Commonwealth, European and International Trust; doi: https://doi.org/10.13039/5011...
In this note, I define error exponents and strong converse exponents for the tasks of distinguishabi...
The Schnorr-Stimm dichotomy theorem [31] concerns finite-state gamblers that bet on infinite sequenc...
The Schnorr-Stimm dichotomy theorem [Schnorr and Stimm, 1972] concerns finite-state gamblers that be...
We construct a family of additive entanglement measures for pure multipartite states. The family is ...
Pairs of states, or "boxes" are the basic objects in the resource theory of asymmetric distinguishab...
Understanding the properties of objects under a natural product operation is a central theme in math...
Given a commutative semiring with a compatible preorder satisfying a version of the Archimedean prop...
Purely multiplicative comparisons of quantum relative entropy are desirable but challenging to prove...
We systematically develop the resource theory of asymmetric distinguishability, as initiated roughly...
We show that the maximum fidelity obtained by a positive partial transpose (p.p.t.) distillation pro...
We study quantum versions of the Shannon capacity of graphs and non-commutative graphs. We introduce...
We extend quantum Stein’s lemma in asymmetric quantum hypothesis testing to composite null and alter...
In this article, we introduce the notion of near semiring with involution. Generalizing the theory o...
In the simple quantum hypothesis testing problem, upper bound with asymmetric setting is shown by us...
Funder: Cambridge Commonwealth, European and International Trust; doi: https://doi.org/10.13039/5011...
In this note, I define error exponents and strong converse exponents for the tasks of distinguishabi...
The Schnorr-Stimm dichotomy theorem [31] concerns finite-state gamblers that bet on infinite sequenc...
The Schnorr-Stimm dichotomy theorem [Schnorr and Stimm, 1972] concerns finite-state gamblers that be...
We construct a family of additive entanglement measures for pure multipartite states. The family is ...