On c-theorems in arbitrary dimensions
Abstract
The dilaton action in 3+1 dimensions plays a crucial role in the proof of the a-theorem. This action arises using Wess-Zumino consistency conditions and crucially relies on the existence of the trace anomaly. Since there are no anomalies in odd dimensions, it is interesting to ask how such an action could arise otherwise. Motivated by this we use the AdS/CFT correspondence to examine both even and odd dimensional CFTs. We find that in even dimensions, by promoting the cut-off to a field, one can get an action for this field which coincides with the WZ action in flat space. In three dimensions, we observe that by finding an exact Hamilton-Jacobi counterterm, one can find a non-polynomial action which is invariant under global Weyl rescalings. We comment on how this finding is tied up with the F-theorem conjectures.
Cite
@article{arxiv.1207.2333,
title = {On c-theorems in arbitrary dimensions},
author = {Arpan Bhattacharyya and Ling-Yan Hung and Kallol Sen and Aninda Sinha},
journal= {arXiv preprint arXiv:1207.2333},
year = {2013}
}
Comments
25 pages, v3: reference added, Cotton tensor dependence of counterterm at eight-derivative order shown, v4: published version