Author:
Craig Nathaniel,Garcia Isabel Garcia,Koren Seth
Abstract
Abstract
In theories with discrete Abelian gauge groups, requiring that black holes be able to lose their charge as they evaporate leads to an upper bound on the product of a charged particle’s mass and the cutoff scale above which the effective description of the theory breaks down. This suggests that a non-trivial version of the Weak Gravity Conjecture (WGC) may also apply to gauge symmetries that are discrete, despite there being no associated massless field, therefore pushing the conjecture beyond the slogan that ‘gravity is the weakest force’. Here, we take a step towards making this expectation more precise by studying ℤ
N
and ℤ
2
N
gauge symmetries realised via theories of spontaneous symmetry breaking. We show that applying the WGC to a dual description of an Abelian Higgs model leads to constraints that allow us to saturate but not violate existing bounds on discrete symmetries based on black hole arguments. In this setting, considering the effect of discrete hair on black holes naturally identifies the cutoff of the effective theory with the scale of spontaneous symmetry breaking, and provides a mechanism through which discrete hair can be lost without modifying the gravitational sector. We explore the possible implications of these arguments for understanding the smallness of the weak scale compared to M
Pl
.
Publisher
Springer Science and Business Media LLC
Subject
Nuclear and High Energy Physics
Reference72 articles.
1. N. Arkani-Hamed, L. Motl, A. Nicolis and C. Vafa, The string landscape, black holes and gravity as the weakest force, JHEP
06 (2007) 060 [hep-th/0601001] [INSPIRE].
2. L.F. Abbott and M.B. Wise, Wormholes and global symmetries, Nucl. Phys.
B 325 (1989) 687 [INSPIRE].
3. S.R. Coleman and K.-M. Lee, Wormholes made without massless matter fields, Nucl. Phys.
B 329 (1990) 387 [INSPIRE].
4. R. Holman, S.D.H. Hsu, T.W. Kephart, E.W. Kolb, R. Watkins and L.M. Widrow, Solutions to the strong CP problem in a world with gravity, Phys. Lett.
B 282 (1992) 132 [hep-ph/9203206] [INSPIRE].
5. R. Kallosh, A.D. Linde, D.A. Linde and L. Susskind, Gravity and global symmetries, Phys. Rev.
D 52 (1995) 912 [hep-th/9502069] [INSPIRE].
Cited by
16 articles.
订阅此论文施引文献
订阅此论文施引文献,注册后可以免费订阅5篇论文的施引文献,订阅后可以查看论文全部施引文献