Missing local operators, zeros, and twist-4 trajectories
High Energy Physics - Theory
2024-05-15 v2
Abstract
The number of local operators in a CFT below a given twist grows with spin. Consistency with analyticity in spin then requires that at low spin, infinitely many Regge trajectories must decouple from local correlation functions, implying infinitely many vanishing conditions for OPE coefficients. In this paper we explain the mechanism behind this infinity of zeros. Specifically, the mechanism is related to the two-point function rather than the three-point function, explaining the vanishing of OPE coefficients in every correlator from a single condition. We illustrate our result by studying twist-4 Regge trajectories in the Wilson--Fisher CFT at one loop.
Keywords
Cite
@article{arxiv.2312.09283,
title = {Missing local operators, zeros, and twist-4 trajectories},
author = {Johan Henriksson and Petr Kravchuk and Brett Oertel},
journal= {arXiv preprint arXiv:2312.09283},
year = {2024}
}
Comments
59 pages, 13 figures + appendices (with 9 more figures)