English

Action principle for OPE

High Energy Physics - Theory 2018-03-14 v3

Abstract

We formulate an "action principle" for the operator product expansion (OPE) describing how a given OPE coefficient changes under a deformation induced by a marginal or relevant operator. Our action principle involves no ad-hoc regulator or renormalization and applies to general (Euclidean) quantum field theories. It implies a natural definition of the renormalization group flow for the OPE coefficients and of coupling constants. When applied to the case of conformal theories, the action principle gives a system of coupled dynamical equations for the conformal data. The last result has also recently been derived (without considering tensor structures) independently by Behan (arXiv:1709.03967) using a different argument. Our results were previously announced and outlined at the meetings "In memoriam Rudolf Haag" in September 2016 and the "Wolfhart Zimmermann memorial symposium" in May 2017.

Keywords

Cite

@article{arxiv.1710.05601,
  title  = {Action principle for OPE},
  author = {Stefan Hollands},
  journal= {arXiv preprint arXiv:1710.05601},
  year   = {2018}
}

Comments

29 pages, 5 figures, based on conference talks at the meetings "In memoriam Rudolf Haag" in September 2016 and the "Wolfhart Zimmermann memorial symposium" in May 2017; v2: details added concerning geometry of field redefinitions, discussion of degeneracies and normalization issues, references edited, other minor editorial changes, v3: edited para on invariant 2-point tensor structures

R2 v1 2026-06-22T22:14:44.518Z