Physics – Mathematical Physics
Scientific paper
2001-04-04
Theor.Math.Phys. 127 (2001) 632-645; Teor.Mat.Fiz. 127 (2001) 268-283
Physics
Mathematical Physics
20 pages LaTeX2e, accepted for publication in Theor. Math. Phys
Scientific paper
The infinite series in Wick powers of a generalized free field are considered that are convergent under smearing with analytic test functions and realize a nonlocal extension of the Borchers equivalence classes. The nonlocal fields to which they converge are proved to be asymptotically commuting, which serves as a natural generalization of the relative locality of the Wick polynomials. The proposed proof is based on exploiting the analytic properties of the vacuum expectation values in x-space and applying the Cauchy--Poincare theorem.
Smirnov Alexander G.
Soloviev Michael A.
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