The Tμ of the conformal scalars

Abstract

We construct the unique primary energy-momentum tensor Tμ for the conformal free scalar with scaling dimension =d/2-ζ as a sum of Gegenbauer polynomials. For integer ζ, the sum truncates at order ζ, compactly reproducing all known results; for the nonlocal case of real ζ, it is an infinite sum, with a two-parameter extension that reflects the nonuniqueness of the nonlocal geometric coupling. We find Tμ by imposing off-shell conservation and tracelessness, and then directly solving the primary condition in momentum space. In the integer ζ case, we reproduce the known two-point function, and confirm the match with the Tμ computed from Juhl's formulae for the GJMS operators (the Weyl-covariant upgrades of (-∂2)ζ), an equality following from the descent of Weyl covariance to conformal invariance.