Quantum fields and motives
Abstract
This is a survey of our results on the relation between perturbative renormalization and motivic Galois theory. The main result is that all quantum field theories share a common universal symmetry realized as a motivic Galois group, whose action is dictated by the divergences and generalizes that of the renormalization group. The existence of such a group was conjectured by P. Cartier based on number theoretic evidence and on the Connes-Kreimer theory of perturbative renormalization. The group provides a universal formula for counterterms and is obtained via a Riemann-Hilbert correspondence classifying equivalence classes of flat equisingular bundles, where the equisingularity condition corresponds to the independence of the counterterms on the mass scale.
Cite
@article{arxiv.hep-th/0504085,
title = {Quantum fields and motives},
author = {Alain Connes and Matilde Marcolli},
journal= {arXiv preprint arXiv:hep-th/0504085},
year = {2015}
}
Comments
29 pages, LaTeX. To appear in Journal of Geometry and Physics