Solving functional flow equations with pseudo-spectral methods
Abstract
We apply pseudo-spectral methods to integrate functional flow equations with high accuracy, extending earlier work on functional fixed point equations \cite{Borchardt:2015rxa}. The advantages of our method are illustrated with the help of two classes of models: first, to make contact with literature, we investigate flows of the O-model in 3 dimensions, for and in the large limit. For the case of a fractal dimension, , and , we follow the flow along a separatrix from a multicritical fixed point to the Wilson-Fisher fixed point over almost 13 orders of magnitude. As a second example, we consider flows of bounded quantum-mechanical potentials, which can be considered as a toy model for Higgs inflation. Such flows pose substantial numerical difficulties, and represent a perfect test bed to exemplify the power of pseudo-spectral methods.
Cite
@article{arxiv.1603.06726,
title = {Solving functional flow equations with pseudo-spectral methods},
author = {Julia Borchardt and Benjamin Knorr},
journal= {arXiv preprint arXiv:1603.06726},
year = {2016}
}
Comments
12 pages, 9 figures