Equivalence of the (generalised) Hadamard and microlocal spectrum condition for (generalised) free fields in curved spacetime
Sanders, Ko
We prove that the singularity structure of all n-point distributions
of a state of a generalised real free scalar field in curved spacetime
can be estimated if the two-point distribution is of Hadamard form. In
particular this applies to the real free scalar field and the result
has applications in perturbative quantum field theory, showing that
the class of all Hadamard states is the state space of interest. In
our proof we assume that the field is a generalised free field,
i.e. that it satisies scalar (c-number) commutation relations, but it
need not satisfy an equation of motion. The same argument also works
for anti-commutation relations and it can be generalised to
vector-valued fields. To indicate the strengths and limitations of our
assumption we also prove the analogues of a theorem by Borchers and
Zimmermann on the self-adjointness of field operators and of a very
weak form of the Jost-Schroer theorem. The original proofs of these
results in the Wightman framework make use of analytic continuation
arguments. In our case no analyticity is assumed, but to some extent
the scalar commutation relations can take its place.
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Last modified: Mi 13. Mai 10:11:38 CEST 2009