Filtrations in Dyson-Schwinger equations: next-to^{j} -leading log expansions systematically

TL;DR

This paper introduces an algebraic method to systematically derive next-to-leading log expansions in Dyson-Schwinger equations, enabling efficient computation of Green functions' higher-order corrections in quantum field theory.

Contribution

It develops a general algebraic approach to extract all next-to^{j}-leading log terms from initial perturbative data in Dyson-Schwinger equations, applicable to various quantum field theories.

Findings

Method successfully applied to Yukawa theory propagator

Method applied to photon self-energy in QED

Enables systematic calculation of higher-order log corrections

Abstract

Dyson-Schwinger equations determine the Green functions $G^r(\alpha,L)$ in quantum field theory. Their solutions are triangular series in a coupling constant $\alpha$ and an external scale parameter $L$ for a chosen amplitude $r$, with the order in $L$ bounded by the order in the coupling. Perturbation theory calculates the first few orders in $\alpha$. On the other hand, Dyson--Schwinger equations determine next-to$^{\{\mathrm{j}\}}$-leading log expansions, $G^r(\alpha,L) = 1 + \sum_{j=0}^\infty \sum_{\mathcal{M}} p_j^{\mathcal{M}}\alpha^j \mathcal{M}(u)$. $\sum_{\mathcal{M}}$ sums a finite number of functions $\mathcal{M}$ in $u = \alpha L/2$. The leading logs come from the trivial representation $\mathcal{M}(u) = \begin{bsmallmatrix}\bullet\end{bsmallmatrix}(u)$ at $j=0$ with $p_0^{\begin{bsmallmatrix}\bullet\end{bsmallmatrix}} = 1$. All non-leading logs are organized by the suppression in powers $\alpha^j$. We describe an algebraic method to derive all next-to$^{\{\mathrm{j}\}}$-leading log terms from the knowledge of the first $(j+1)$ terms in perturbation theory and their filtrations. This implies the calculation of the functions $\mathcal{M}(u)$ and periods $p_j^\mathcal{M}$. In the first part of our paper, we investigate the structure of Dyson-Schwinger equations and develop a method to filter their solutions. Applying renormalized Feynman rules maps each filtered term to a certain power of $\alpha$ and $L$ in the log-expansion. Based on this, the second part derives the next-to$^{\{\mathrm{j}\}}$-leading log expansions. Our method is general. Here, we exemplify it using the examples of the propagator in Yukawa theory and the photon self-energy in quantum electrodynamics. The reader may apply our method to any (set of) Dyson-Schwinger equation(s) appearing in renormalizable quantum field theories.