arXiv:1211.4466 Abstract | arXiv Analytics

arXiv:1211.4466 [math-ph]Abstract References Reviews Resources

Dynkin operators, renormalization and the geometric $β$ function

Published 2012-11-19Version 1

In this paper, I show a close connection between renormalization and a generalization of the Dynkin operator in terms of logarithmic derivations. The geometric $\beta$ function, which describes the dependence of a Quantum Field Theory on an energy scale defines is defined by a complete vector field on a Lie group $G$ defined by a QFT. It also defines a generalized Dynkin operator.

Categories: math-ph, hep-th, math.DS, math.MP

Keywords: renormalization, complete vector field, energy scale defines, quantum field theory, lie group

Related articles: Most relevant | Search more

arXiv:0907.3735 [math-ph] (Published 2009-07-22)

Talk on Anomalies in Quantum Field Theory and Cohomologies of Configuration Spaces

Nikolay M. Nikolov

arXiv:1210.1115 [math-ph] (Published 2012-10-03)

Noncommutative Gravity and Quantum Field Theory on Noncommutative Curved Spacetimes

Alexander Schenkel

arXiv:0910.2296 [math-ph] (Published 2009-10-13, updated 2009-11-21)

Mathematical definition of quantum field theory on a manifold

A. V. Stoyanovsky