A PDE construction of the Euclidean 43 quantum field theory

Abstract

We present a new construction of the Euclidean 4 quantum field theory on R3 based on PDE arguments. More precisely, we consider an approximation of the stochastic quantization equation on R3 defined on a periodic lattice of mesh size and side length M. We introduce a new renormalized energy method in weighted spaces and prove tightness of the corresponding Gibbs measures as → 0, M → ∞. Every limit point is non-Gaussian and satisfies reflection positivity, translation invariance and stretched exponential integrability. These properties allow to verify the Osterwalder--Schrader axioms for a Euclidean QFT apart from rotation invariance and clustering. Our argument applies to arbitrary positive coupling constant, to multicomponent models with O(N) symmetry and to some long-range variants. Moreover, we establish an integration by parts formula leading to the hierarchy of Dyson--Schwinger equations for the Euclidean correlation functions. To this end, we identify the renormalized cubic term as a distribution on the space of Euclidean fields.