$F$-extremization determines certain large-$N$ CFTs
Abstract
We show that the conformal data of a range of large- CFTs, the melonic CFTs, are specified by constrained extremization of the universal part of the sphere free energy , called . This family includes the generalized SYK models, the vector models (O, Gross-Neveu, etc.), and the tensor field theories. The known and -maximization procedures in SCFTs are therefore extended to these non-supersymmetric CFTs in continuous . We establish our result using the two-particle irreducible (2PI) effective action, and, equivalently, by Feynman diagram resummation. interpolates in continuous dimension between the known -functions, so we interpret this result as an extremization of the number of IR degrees of freedom, in the spirit of the generalized -theorems. The outcome is a complete classification of the melonic CFTs: they are the conformal mean field theories which extremize the universal part of the sphere free energy, subject to an IR marginality condition on the interaction Lagrangian.
Cite
@article{arxiv.2412.10499,
title = {$F$-extremization determines certain large-$N$ CFTs},
author = {Ludo Fraser-Taliente and John Wheater},
journal= {arXiv preprint arXiv:2412.10499},
year = {2024}
}
Comments
34 + 4 pages, 8 figures