Related papers: Generalized Stein's lemma and asymptotic equipartition property for subalgebra entropies

Generalized Stein's lemma and asymptotic equipartition property for subalgebra entropies

URL: http://arxiv.org/abs/2401.03090v2
Date: Fri, 12 Jul 2024 18:52:36 GMT
Title: Generalized Stein's lemma and asymptotic equipartition property for subalgebra entropies
Authors: Li Gao, Mizanur Rahaman,
Abstract summary: We show that the assertion of the generalized quantum Stein's lemma is true for the setting where the second hypothesis is the state space of any subalgebra $mathcalN$. As an application in resource theory, we show that the relative entropy of a subalgebra is the dilution cost under suitable operations.
Score: 12.294224442885891
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: The quantum Stein's lemma is a fundamental result of quantum hypothesis testing in the context of distinguishing two quantum states. A recent conjecture, known as the ``generalized quantum Stein's lemma", asserts that this result is true in a general framework where one of the states is replaced by convex sets of quantum states. In this work, we show that the assertion of the generalized Stein's lemma is true for the setting where the second hypothesis is the state space of any subalgebra $\mathcal{N}$. This is obtained through a strong asymptotic equipartition property for smooth subalgebra entropies that applies for any fixed smoothing parameter $\epsilon\in (0,1)$. As an application in resource theory, we show that the relative entropy of a subalgebra is the asymptotic dilution cost under suitable operations. This provides a scope to establish a connection between different quantum resources.

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