Bootstrapping $O(N)$ Vector Models in $4<d<6$
Abstract
We use the conformal bootstrap to study conformal field theories with global symmetry in and spacetime dimensions that have a scalar operator transforming as an vector. The crossing symmetry of the four-point function of this vector operator, along with unitarity assumptions, determine constraints on the scaling dimensions of conformal primary operators in the OPE. Imposing a lower bound on the second smallest scaling dimension of such an -singlet conformal primary, and varying the scaling dimension of the lowest one, we obtain an allowed region that exhibits a kink located very close to the interacting -symmetric CFT conjectured to exist recently by Fei, Giombi, and Klebanov. Under reasonable assumptions on the dimension of the second lowest singlet in the OPE, we observe that this kink disappears in for small enough , suggesting that in this case an interacting CFT may cease to exist for below a certain critical value.
Cite
@article{arxiv.1412.7746,
title = {Bootstrapping $O(N)$ Vector Models in $4<d<6$},
author = {Shai M. Chester and Silviu S. Pufu and Ran Yacoby},
journal= {arXiv preprint arXiv:1412.7746},
year = {2015}
}
Comments
24 pages, 5 figures; v2 minor improvements