Abstract
It is shown that the modulus of any graded or, more generally, twisted KMS– functional of a C–dynamical system is proportional to an ordinary KMS–state and the twist is weakly inner in the corresponding GNS–representation. If the functional is invariant under the adjoint action of some asymptotically abelian family of automorphisms, then the twist is trivial. As a consequence, such functionals do not exist for supersymmetric C–dynamical systems. This is in contrast with the situation in compact spaces where super KMS–functionals occur as super-Gibbs functionals. ∗Supported in part by GNAFA and MURST.
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