High-accuracy scaling exponents in the local potential approximation
摘要
We test equivalences between different realisations of Wilson's renormalisation group by computing the leading, subleading, and anti-symmetric corrections-to-scaling exponents, and the full fixed point potential for the Ising universality class to leading order in a derivative expansion. We discuss our methods with a special emphasis on accuracy and reliability. We establish numerical equivalence of Wilson-Polchinski flows and optimised renormalisation group flows with an unprecedented accuracy in the scaling exponents. Our results are contrasted with high-accuracy findings from Dyson's hierarchical model, where a tiny but systematic difference in all scaling exponents is established. Further applications for our numerical methods are briefly indicated.
引用
@article{arxiv.hep-th/0701172,
title = {High-accuracy scaling exponents in the local potential approximation},
author = {Claude Bervillier and Andreas Juttner and Daniel F. Litim},
journal= {arXiv preprint arXiv:hep-th/0701172},
year = {2008}
}
备注
9 pages, 7 figures, comparison and discussion/conclusions sharpened, references added