Spectral density constraints in quantum field theory

TL;DR

This paper introduces a method to constrain spectral densities in quantum field theories by matching short-distance expansions with operator product expansions, providing insights into non-perturbative effects in QCD.

Contribution

It presents a novel approach for constraining spectral densities in QFT using spectral and operator product expansion matching, applied to scalar and quark propagators.

Findings

Constraints on spectral densities and OPE condensates obtained.

Decomposition of perturbative and non-perturbative quark condensates demonstrated.

Non-perturbative contributions linked to spectral density structure.

Abstract

Determining the structure of spectral densities is important for understanding the behaviour of any quantum field theory (QFT). However, the exact calculation of these quantities often requires a full non-perturbative description of the theory, which for physically realistic theories such as quantum chromodynamics (QCD) is currently unknown. Nevertheless, it is possible to infer indirect information about these quantities. In this paper we demonstrate an approach for constraining the form of spectral densities associated with QFT propagators, which involves matching the short distance expansion of the spectral representation with the operator product expansion (OPE) of the propagators. As an application of this procedure we analyse the scalar propagator in $\phi^4$-theory and the quark propagator in QCD, and show that constraints are obtained on the spectral densities and the OPE condensates. In particular, it is demonstrated that the perturbative and non-perturbative contributions to the quark condensate in QCD can be decomposed, and that the non-perturbative contributions are related to the structure of the continuum component of the scalar spectral density.