Integral and differential structures for quantum field theory

TL;DR

This paper demonstrates how Orlicz space formalism and noncommutative differential structures can be effectively integrated into quantum field theory, providing new tools for analyzing field operators and equations of motion.

Contribution

It introduces a novel application of Orlicz spaces to quantum field theory and develops noncommutative differential geometric structures for local algebras on Lorentzian manifolds.

Findings

Orlicz spaces effectively describe regularity of quantum fields

Local algebras on Lorentzian manifolds can be equipped with noncommutative differential structures

The formalism aids in understanding equations of motion in quantum field theory

Abstract

The aim of this work is to firstly demonstrate the efficacy of the recently proposed Orlicz space formalism for Quantum theory \cite{ML}, and secondly to show how noncommutative differential structures may naturally be incorporated into this framework. To start off with we specifically propose regularity conditions which in the context of local algebras corresponding to Minkowski space, ensure good behaviour of field operators as observables, and then show that fields obtained by the Osterwalder-Schrader reconstruction theorem are regular in this sense. The pair of Orlicz spaces we explicitly use for this purpose, are respectively built on the exponential function and on an entropic type function. This formalism has been shown to be well suited to a description of quantum statistical mechanics, and in the present work we show that it is also a very useful and elegant tool for Quantum Field Theory. We then introduce the class of tangentially conditioned algebras, which is a large class of local algebras corresponding to globally hyperbolic Lorentzian manifolds that locally ``look like'' the local algebras of Minkowski space. On the one hand this ensures that at a local level, the Orlicz space formalism discussed above is also relevant for a much more general class of local algebras. On the other hand, the structure of this class of algebras, allows for the development of a non-commutative differential geometric structure along the lines of the du Bois-Violette approach to such a theory. In this way we obtain a complete depiction: integrable structures based on local algebras provide a static setting for an analysis of Quantum Field Theory and an effective tool for describing regular behaviour of field operators, whereas differentiable structures posit indispensable tools for a description of equations of motion.