$C_T$ for conformal higher spin fields from partition function on conically deformed sphere
Abstract
We consider the one-parameter generalization of 4-sphere with a conical singularity due to identification in one isometric angle. We compute the value of the spectral zeta-function at zero that controls the coefficient of the logarithmic UV divergence of the one-loop partition function on . While the value of the conformal anomaly a-coefficient is proportional to , we argue that in general the second anomaly coefficient is related to a particular combination of the second and first derivatives of at . The universality of this relation for is supported also by examples in 6 and 2 dimensions. We use it to compute the c-coefficient for conformal higher spins finding that it coincides with the "" value of the one-parameter Ansatz suggested in arXiv:1309.0785. Like the sums of and coefficients, the regularized sum of over the whole tower of conformal higher spins is found to vanish, implying UV finiteness on and thus also the vanishing of the associated Re'nyi entropy. Similar conclusions are found to apply to the standard 2-derivative massless higher spin tower. We also present an independent computation of the full set of conformal anomaly coefficients of the 6d Weyl graviton theory defined by a particular combination of the three 6d Weyl invariants that has a (2,0) supersymmetric extension.
Keywords
Cite
@article{arxiv.1707.02456,
title = {$C_T$ for conformal higher spin fields from partition function on conically deformed sphere},
author = {Matteo Beccaria and Arkady A. Tseytlin},
journal= {arXiv preprint arXiv:1707.02456},
year = {2017}
}
Comments
29 pages. v2: minor changes