The sphere free energy of the vector models to order 1/N

Abstract

We calculate the large-N expansion of the sphere free energy F=- ZSd of the O(N) φ4 and the Gross-Neveu ( )2 CFTs to order 1/N. Analytic regularization of these theories requires consistently shifting the UV scaling dimension of the auxiliary field: this can only be done by modifying its kinetic term. This modification combines with the counterterms to give the result that matches the ε-expansion, resolving a puzzle raised by Tarnopolsky in arXiv:1609.09113. These Fs can be written compactly in terms of the anomalous dimensions, for both the short-range and the long-range versions of these CFTs. We also provide various technical results including a computation of the counterterms on the sphere and a neat derivation of the sphere free energy of a free conformal field. Finally, we observe that the long-range CFT becomes the short-range CFT at exactly the point where its F =- π d2 F is maximized as a function of the vector's scaling dimension.