Dynamical Selection of Critical Exponents
Abstract
In renormalized field theories there are in general one or few fixed points which are accessible by the renormalization-group flow. They can be identified from the fixed-point equations. Exceptionally, an infinite family of fixed points exists, parameterized by a scaling exponent , itself function of a non-renormalizing parameter. Here we report a different scenario with an infinite family of fixed points of which seemingly only one is chosen by the renormalization-group flow. This dynamical selection takes place in systems with an attractive interaction , as in standard theory, but where the potential at large goes to zero, as e.g. the attraction by a defect.
Cite
@article{arxiv.1602.00601,
title = {Dynamical Selection of Critical Exponents},
author = {Kay Joerg Wiese},
journal= {arXiv preprint arXiv:1602.00601},
year = {2016}
}
Comments
v2: Several misprints corrected, appendix on toy model rendered more relevant. 13 pages, 22 figures