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Communications in Number Theory and Physics
Volume 15 (2021)
Number 4
Geometries in perturbative quantum field theory
Pages: 743 – 791
DOI: https://dx.doi.org/10.4310/CNTP.2021.v15.n4.a2
Author
Abstract
In perturbative quantum field theory one encounters certain, very specific geometries over the integers. These perturbative quantum geometries determine the number contents of the amplitude considered. In the article ‘Modular forms in quantum field theory’ F. Brown and the author report on a first list of perturbative quantum geometries using the $c_2$-invariant in $\varphi^4$ theory. A main tool was denominator reduction which allowed the authors to examine graphs up to loop order (first Betti number) 10.
We introduce an improved quadratic denominator reduction which makes it possible to extend the previous results to loop order 11 (and partially orders 12 and 13). For comparison, also $\varphi^4$ graphs are investigated. Here, we extend the results from loop order 9 to 10. The new database of 4801 unique $c_2$-invariants (previously 157)—while being consistent with all major $c_2$-conjectures—leads to a more refined picture of perturbative quantum geometries. In the appendix, Friedrich Knop proves a Chevalley–Warning–Ax theorem for double covers of affine space.
Keywords
Feynman period, $c_2$-invariant
2010 Mathematics Subject Classification
14M99, 81T99
Appendix by Friedrich Knop (Department Mathematik, Friedrich-Alexander-Universität Erlangen-Nürnberg, Erlangen, Germany)
Oliver Schnetz is supported by the DFG grant SCHN 1240.
Received 17 May 2019
Accepted 9 June 2021
Published 6 October 2021