Comments on Squashed-sphere Partition Functions
Abstract
We study the partition function of odd-dimensional conformal field theories placed on spheres with a squashed metric. We establish that the round sphere provides a local extremum for the free energy which, in general, is not a global extremum. In addition, we show that the leading quadratic correction to the free energy around this extremum is proportional to the coefficient, , determining the two-point function of the energy-momentum tensor in the CFT. For three-dimensional CFTs, we compute explicitly this proportionality constant for a class of squashing deformations which preserve an isometry group on the sphere. In addition, we evaluate the free energy as a function of the squashing parameter for theories of free bosons, free fermions, as well as CFTs holographically dual to Einstein gravity with a negative cosmological constant. We observe that, after suitable normalization, the dependence of the free energy on the squashing parameter for all these theories is nearly universal for a large region of parameter space and is well approximated by a simple quadratic function arising from holography. We generalize our results to five-dimensional CFTs and, in this context, we also study theories holographically dual to six-dimensional Gauss-Bonnet gravity.
Cite
@article{arxiv.1705.00292,
title = {Comments on Squashed-sphere Partition Functions},
author = {Nikolay Bobev and Pablo Bueno and Yannick Vreys},
journal= {arXiv preprint arXiv:1705.00292},
year = {2017}
}
Comments
40 pages, 7 figures, 1 table; v2: additional comments and clarifications added, updated bibliography