# New graph polynomials in parametric QED Feynman integrals

**Authors:** Marcel Golz

arXiv: 1703.05134 · 2017-09-14

## TL;DR

This paper introduces new graph polynomials that simplify the parametric Feynman integrals in quantum electrodynamics, revealing a rich combinatorial structure and enabling explicit sum representations.

## Contribution

It develops a novel class of graph polynomials for gauge theories, extending algebraic geometric methods to QED Feynman integrals with explicit combinatorial interpretations.

## Key findings

- Explicit sum representations of QED integrands using new graph polynomials
- Revealed combinatorial structure via cycle subgraphs of Feynman graphs
- Enhanced understanding of gauge theory integrals through algebraic geometry

## Abstract

In recent years enormous progress has been made in perturbative quantum field theory by applying methods of algebraic geometry to parametric Feynman integrals for scalar theories. The transition to gauge theories is complicated not only by the fact that their parametric integrand is much larger and more involved. It is, moreover, only implicitly given as the result of certain differential operators applied to the scalar integrand $\exp(-\Phi_{\Gamma}/\Psi_{\Gamma})$, where $\Psi_{\Gamma}$ and $\Phi_{\Gamma}$ are the Kirchhoff and Symanzik polynomials of the Feynman graph $\Gamma$. In the case of quantum electrodynamics we find that the full parametric integrand inherits a rich combinatorial structure from $\Psi_{\Gamma}$ and $\Phi_{\Gamma}$. In the end, it can be expressed explicitly as a sum over products of new types of graph polynomials which have a combinatoric interpretation via simple cycle subgraphs of $\Gamma$.

## Full text

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## Figures

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## References

27 references — full list in the complete paper: https://tomesphere.com/paper/1703.05134/full.md

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Source: https://tomesphere.com/paper/1703.05134