Open AccessOn KMS Boundary Condition
Author(s) -
Huzihiro Araki,
Hideo Miyata
Publication year - 1968
Publication title -
publications of the research institute for mathematical sciences
Language(s) - English
Resource type - Journals
eISSN - 1663-4926
pISSN - 0034-5318
DOI - 10.2977/prims/1195194881
Subject(s) - abelian group , mathematics , invariant (physics) , representation (politics) , boundary value problem , state (computer science) , pure mathematics , decomposition , mathematical analysis , mathematical physics , algorithm , law , politics , political science , ecology , biology
An invariant state satisfying the Kubo-Martin-Schwinger condition is studied. It is shown that the decomposition of a given state into extremal invariant states yields states satisfying the KMS boundary condition if and only if the cyclic representation associated with the given state is ??-abelian, and that, if this is the case, the decomposition coincides with the standard central decomposition. The structure of the cyclic representation when it is non ?7-abelian is analyzed and typical examples are given. One of the examples gives a case where the cyclic representation is G-abelian but not Ty-abelian.
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