A Stronger Subadditivity of Entropy
Abstract
The strong subadditivity of entropy plays a key role in several areas of physics and mathematics. It states that the entropy S[]= - Tr ( ) of a density matrix 123 on the product of three Hilbert spaces satisfies S[123] - S[23] ≤ S[12]- S[2]. We strengthen this to S[123] - S[12] ≤ Σα nα (S[23α ] - S[2α ]), where the nα are weights and the 23α are partitions of 23. Correspondingly, there is a strengthening of the theorem that the map A -> Tr [L + A] is concave. As applications we prove some monotonicity and convexity properties of the Wehrl entropy and entropy inequalities for quantum gases.
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