CFT Constraints on the Weak Gravity Conjecture

Abstract

The Weak Gravity Conjecture (WGC) is a swampland criterion of long standing: any consistent theory of quantum gravity must contain a charged particle whose charge-to-mass ratio exceeds that of an extremal black hole, so that gravity remains the weakest force. The AdS/CFT correspondence offers a calculable boundary handle on bulk gravity, and the imaginary parts of bulk quasinormal modes are read off the boundary as poles of a retarded Green's function. We show that the WGC follows from this boundary calculation in two settings that fall outside the Reissner--Nordström idealisation: static spherically symmetric black holes in dRGT massive gravity, and dyonic black holes in Einstein--ModMax non-linear electrodynamics. The chain runs from the metric and gauge field, through the charged Klein--Gordon equation, into a near-horizon scaling limit whose radial equation reduces to Whittaker form; the conformal weight ν0 then enters a damping-time inequality. For the dRGT black hole every massive-gravity parameter (α,β,mg,h) cancels out, leaving the universal saturation q/(m r+) ≥ 1/2 ≈ 0.707. For the Einstein--ModMax black hole the duality-symmetric non-linearity parameter γ survives, and yields q/(m r+) ≥ e-γ/2, which reduces to the Reissner--Nordström bound q/(m r+) ≥ 1 in the Maxwell limit γ 0. Either result is of order unity, and the second weakens monotonically as the non-linearity grows. We then relax three of the simplifying assumptions of the dRGT derivation, namely exact extremality, minimal coupling, and the absence of higher-curvature terms. The cancellation breaks. Each correction reintroduces mg,α,β into the bound through a controlled functional dependence, and we tabulate and plot the relaxed forms across parameter space.