English

Interpolating between $a$ and $F$

High Energy Physics - Theory 2015-05-06 v4 High Energy Physics - Phenomenology

Abstract

We study the dimensional continuation of the sphere free energy in conformal field theories. In continuous dimension dd we define the quantity F~=sin(πd/2)logZ\tilde F=\sin (\pi d/2)\log Z, where ZZ is the path integral of the Euclidean CFT on the dd-dimensional round sphere. F~\tilde F smoothly interpolates between (1)d/2π/2(-1)^{d/2}\pi/2 times the aa-anomaly coefficient in even dd, and (1)(d+1)/2(-1)^{(d+1)/2} times the sphere free energy FF in odd dd. We calculate F~\tilde F in various examples of unitary CFT that can be continued to non-integer dimensions, including free theories, double-trace deformations at large NN, and perturbative fixed points in the ϵ\epsilon expansion. For all these examples F~\tilde F is positive, and it decreases under RG flow. Using perturbation theory in the coupling, we calculate F~\tilde F in the Wilson-Fisher fixed point of the O(N)O(N) vector model in d=4ϵd=4-\epsilon to order ϵ4\epsilon^4. We use this result to estimate the value of FF in the 3-dimensional Ising model, and find that it is only a few percent below FF of the free conformally coupled scalar field. We use similar methods to estimate the FF values for the U(N)U(N) Gross-Neveu model in d=3d=3 and the O(N)O(N) model in d=5d=5. Finally, we carry out the dimensional continuation of interacting theories with 4 supercharges, for which we suggest that F~\tilde F may be calculated exactly using an appropriate version of localization on SdS^d. Our approach provides an interpolation between the aa-maximization in d=4d=4 and the FF-maximization in d=3d=3.

Keywords

Cite

@article{arxiv.1409.1937,
  title  = {Interpolating between $a$ and $F$},
  author = {Simone Giombi and Igor R. Klebanov},
  journal= {arXiv preprint arXiv:1409.1937},
  year   = {2015}
}

Comments

41 pages, 4 figures. v4: Eqs. (1.6), (4.13) and (5.37) corrected; footnote 9 added discussing the Euler density counterterm

R2 v1 2026-06-22T05:50:03.886Z