English

1-Loop improved lattice action for the nonlinear sigma-model

High Energy Physics - Lattice 2015-06-25 v1

Abstract

In this paper we show the Wilson effective action for the 2-dimensional O(N+1)-symmetric lattice nonlinear sigma-model computed in the 1-loop approximation for the nonlinear choice of blockspin Φ(x)\Phi(x), Φ(x)=\Cavϕ(x)/\Cavϕ(x)\Phi(x)= \Cav\phi(x)/{|\Cav\phi(x)|},where \Cav\Cav is averaging of the fundamental field ϕ(z)\phi(z) over a square xx of side a~\tilde a. The result for SeffS_{eff} is composed of the classical perfect action with a renormalized coupling constant βeff\beta_{eff}, an augmented contribution from a Jacobian, and further genuine 1-loop correction terms. Our result extends Polyakov's calculation which had furnished those contributions to the effective action which are of order lna~/a\ln \tilde a /a, where aa is the lattice spacing of the fundamental lattice. An analytic approximation for the background field which enters the classical perfect action will be presented elsewhere.

Keywords

Cite

@article{arxiv.hep-lat/9909149,
  title  = {1-Loop improved lattice action for the nonlinear sigma-model},
  author = {M. Bartels and G. Mack and G. Palma},
  journal= {arXiv preprint arXiv:hep-lat/9909149},
  year   = {2015}
}

Comments

3 (2-column format) pages, 1 tex file heplat99.tex, 1 macro package Espcrc2.sty To appear in Nucl. Phys. B, Proceedings Supplements Lattice 99