# Graph Reconstruction, Functorial Feynman Rules and Superposition   Principles

**Authors:** Yuri Ximenes Martins, Rodney Josu\'e Biezuner

arXiv: 1903.06284 · 2019-03-18

## TL;DR

This paper introduces functorial Feynman rules for hypergraphs, linking reconstruction conjectures with superposition principles through a sheaf-theoretic framework, with applications in quantum field theory and graph theory.

## Contribution

It generalizes Feynman rules to arbitrary hypergraphs and establishes a sheaf-theoretic approach to hypergraph reconstruction and superposition principles.

## Key findings

- Functorial Feynman rules apply to structured hypergraphs.
- Reconstruction conjectures are characterized by sheaf theory.
- Feynman rules induce superposition principles under certain conditions.

## Abstract

In this article functorial Feynman rules are introduced as large generalizations of physicists Feynman rules, in the sense that they can be applied to arbitrary classes of hypergraphs, possibly endowed with any kind of structure on their vertices and hyperedges. We show that the reconstruction conjecture for classes of (possibly structured) hypergraphs admit a sheaf-theoretic characterization, allowing us to consider analogous conjectures. We propose an axiomatization for the notion of superposition principle and prove that the functorial Feynman rules work as a bridge between reconstruction conjectures and superposition principles, meaning that a conjecture for a class of hypergraphs is satisfied only if each functorial Feynman rule defined on it induces a superposition principle. Applications in perturbative euclidean quantum field theory and graph theory are given.

## Full text

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Source: https://tomesphere.com/paper/1903.06284