Renormalization in combinatorially non-local field theories: the Hopf algebra of 2-graphs
Thürigen J
Research article (journal) | Peer reviewedAbstract
Renormalization in perturbative quantum field theory is based on a Hopf algebra of Feynman diagrams. A precondition for this is locality. Therefore one might suspect that non-local field theories such as matrix or tensor field theories cannot benefit from a similar algebraic understanding. Here I show that, on the contrary, perturbative renormalization of a broad class of such field theories is based in the same way on a Hopf algebra. Their interaction vertices have the structure of graphs. This gives the necessary concept of locality and leads to Feynman diagrams defined as “2-graphs” which generate the Hopf algebra. These results set the stage for a systematic study of perturbative renormalization as well as non-perturbative aspects, e.g. Dyson-Schwinger equations, for a number of combinatorially non-local field theories with possible applications to random geometry and quantum gravity.
Details about the publication
Authors from the University of Münster
| Thürigen, Johannes |
Projects the publication originates from
Duration: 01/06/2019 - 12/08/2022 | 1st Funding period Funded by: DFG - Individual Grants Programme Type of project: Individual project |
Talks on the publication
| Algebraic Structures in Renormalization of Tensorial Fields Thürigen, Johannes (18/05/2022) Random Geometry in Heidelberg, Heidelberg Type of talk: scientific Talk |