Feynman graphs, rooted trees, and Ringel-Hall algebras

Kobi Kremnizer; Matthew Szczesny

doi:10.1007/s00220-008-0694-z

Feynman graphs, rooted trees, and Ringel-Hall algebras

Quantum Algebra 2009-11-13 v1 Category Theory

Authors: Kobi Kremnizer , Matthew Szczesny

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Abstract

We construct symmetric monoidal categories $\LRF, \FD$ of rooted forests and Feynman graphs. These categories closely resemble finitary abelian categories, and in particular, the notion of Ringel-Hall algebra applies. The Ringel-Hall Hopf algebras of $\LRF, \FD$ , $\HH_{\LRF}, \HH_{\FD}$ are dual to the corresponding Connes-Kreimer Hopf algebras on rooted trees and Feynman graphs. We thus obtain an interpretation of the Connes-Kreimer Lie algebras on rooted trees and Feynman graphs as Ringel-Hall Lie algebras.

Keywords

hopf algebras root systems monoidal category theory

Cite

@article{arxiv.0806.1179,
  title  = {Feynman graphs, rooted trees, and Ringel-Hall algebras},
  author = {Kobi Kremnizer and Matthew Szczesny},
  journal= {arXiv preprint arXiv:0806.1179},
  year   = {2009}
}

Feynman graphs, rooted trees, and Ringel-Hall algebras

Abstract

Keywords

Cite

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