The Universal RG Machine
Abstract
Functional Renormalization Group Equations constitute a powerful tool to encode the perturbative and non-perturbative properties of a physical system. We present an algorithm to systematically compute the expansion of such flow equations in a given background quantity specified by the approximation scheme. The method is based on off-diagonal heat-kernel techniques and can be implemented on a computer algebra system, opening access to complex computations in, e.g., Gravity or Yang-Mills theory. In a first illustrative example, we re-derive the gravitational -functions of the Einstein-Hilbert truncation, demonstrating their background-independence. As an additional result, the heat-kernel coefficients for transverse vectors and transverse-traceless symmetric matrices are computed to second order in the curvature.
Cite
@article{arxiv.1012.3081,
title = {The Universal RG Machine},
author = {Dario Benedetti and Kai Groh and Pedro F. Machado and Frank Saueressig},
journal= {arXiv preprint arXiv:1012.3081},
year = {2011}
}
Comments
38 pages