Muldrow Etheredge - Dense Geodesics, Tower Alignment, and the Sharpened Distance Conjecture
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- Опубліковано 3 жов 2023
- The Sharpened Distance Conjecture and Tower Scalar Weak Gravity Conjecture are closely related but distinct conjectures, neither one implying the other. Motivated by examples, I propose that both are consequences of two new conjectures: 1. The infinite distance geodesics passing through an arbitrary point φ in the moduli space populate a dense set of directions in the tangent space at φ. 2. Along any infinite distance geodesic, there exists a tower of particles whose scalar-charge-to-mass ratio (-∇ log m) projection everywhere along the geodesic is greater than or equal to 1/\sqrt(d-2). I perform several nontrivial tests of these new conjectures in maximal and half-maximal supergravity examples. I also use the Tower Scalar Weak Gravity Conjecture to conjecture a sharp bound on exponentially heavy towers that accompany infinite distance limits. Based on 2308.01331.
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