Conformal anomalies for higher derivative free critical p-forms on even spheres

Abstract

The conformal anomaly is computed on even d--spheres for a p--form propagating according to the Branson--Gover higher derivative, conformally covariant operators. The system is set up on a q--deformed sphere and the conformal anomaly is computed as a rational function of the derivative order, 2k, and of q. The anomaly is shown to be an extremum at the round sphere (q=1) only for k<d/2. At these integer values, therefore, the entanglement entropy is minus the conformal anomaly, as usual. The unconstrained p--form conformal anomaly on the full sphere is shown to be given by an integral over the Plancherel measure for a coexact form on hyperbolic space in one dimension higher.A natural ghost sum is constructed and leads to quantities which, for critical forms, i.e. when 2k=d-2p, are, remarkably, a simple combination of standard quantities, for usual second order, k=1, propagation, when these are available. Our values coincide with a recent hyperbolic computation of David and Mukherjee.Values are suggested for the Casimir energy on the Einstein cylinder from the behaviour of the conformal anomaly as q0 and compared with known results written as alternating sums over scalar values.