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Schwinger function
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=== Temperedness === Temperedness axiom (E0) says that Schwinger functions are [[Distribution (mathematics)|tempered distributions]] away from coincident points. This means that they can be integrated against [[Schwartz space|Schwartz]] test functions which vanish with all their derivatives at configurations where two or more points coincide. It can be shown from this axiom and other OS axioms (but not the linear growth condition) that Schwinger functions are in fact real-analytic away from coincident points.
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