Exact Schwinger functions for a class of bounded interactions in d≥ 2

Abstract

We consider a scalar Euclidean QFT with interaction given by a bounded, measurable function V such that V:=w ∞V(w) exist. We find a field renormalization such that all the n-point connected Schwinger functions for n≠ 2 exist non-perturbatively in the UV limit. They coincide with the tree-level one-particle irreducible Schwinger functions of the erf(φ/2) interaction with a coupling constant 12 (V+ - V-). By a slight modification of our construction we can change this coupling constant to 12 (V+ - V-), where V:= w 0 V(w). Thereby non-Gaussianity of these latter theories is governed by a discontinuity of V at zero. The open problem of controlling also the two-point function of these QFTs is discussed.

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