The "non triviality" of a $\Phi_4^4$ model, III, the "Osterwalder-Schrader Positivity"

TL;DR

This paper demonstrates that a constructed non trivial solution to the $\

Contribution

It shows how properties of the solution ensure Osterwalder-Schrader Positivity in the $\

Findings

Verifies Osterwalder-Schrader Positivity for the model.

Complements previous work establishing axiomatic properties.

Uses splitting-tree and alternating signs properties.

Abstract

The present paper, III, is the third part of a series of papers, under the global title "the non triviality of a $\Phi_4^4$ model". Parts I and II have been previously completed. In them thanks to the properties we dubbed "splitting -tree structure", and "alternating signs", which characterize our connected Green's functions, we have constructed a unique non trivial solution to a $\Phi_4^4$ non linear renormalized system of equations of motion in Euclidean space. In the present work, we show how, by application of these properties, the solution of our $\Phi^4_4$ model verifies the Osterwalder-Schrader Positivity requirement. This result complements those obtained in I and II where, apart from the Positivity, the Axiomatic Quantum Field theory properties have been established. The O.S. Positivity is verified under a condition on the physical coupling constant relatively weaker than the one imposed in order to obtain the convergence of the $\Phi^4_4$ mapping to the unique non trivial solution.