The Moduli Space Curvature and the Weak Gravity Conjecture
Abstract
We unveil a remarkable interplay between rigid field theories (RFTs), charge-to-mass ratios γ and scalar curvature divergences R div in the vector multiplet moduli space of 4d N=2 supergravities, obtained upon compactifying type II string theory on Calabi--Yau threefolds. We show that the condition to obtain an RFT that decouples from gravity implies a divergence in the γ of (would-be) BPS particles charged under the rigid theory, and vice-versa. For weak coupling limits, where the scalar curvature diverges, we argue that such BPS particles exist and that R div γ2, implying that all these divergences are a consequence of RFT limits. More precisely, along geodesics we find that R div ( wgc/g)2, where wgc g rigid M Pl is the RFT cut-off estimate of the Weak Gravity Conjecture and g = g rigid-2 RFT the electrostatic energy integrated up to its actual cut-off RFT.
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