Can one dent a dyon?

Coleman, Sidney; Parke, Stephen J.; Neveu, A.; Sommerfield, Charles M.

doi:10.1103/physrevd.15.544

Cited by 86 publications

(67 citation statements)

References 3 publications

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“…These are known as the BPS self-duality equations [28,29]. By considering axially symmetric configurations these equations reduce to (2.14) with λ = 2e 2 .…”

Section: Jhep02(2016)063mentioning

confidence: 99%

Galileon Higgs vortices

Chagoya

Tasinato

2016

J. High Energ. Phys.

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Vortex solutions are topologically stable field configurations that can play an important role in condensed matter, field theory, and cosmology. We investigate vortex configuration in a 2+1 dimensional Abelian Higgs theory supplemented by higher order derivative self-interactions, related with Galileons. Our vortex solutions have features that make them qualitatively different from well-known Abrikosov-Nielsen-Olesen configurations, since the derivative interactions turn on gauge invariant field profiles that break axial symmetry. By promoting the system to a 3+1 dimensional string configuration, we study its gravitational backreaction. Our results are all derived within a specific, analytically manageable system, and might offer indications for understanding Galileonic interactions and screening mechanisms around configurations that are not spherically symmetric, but only at most cylindrically symmetric.

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“…These are known as the BPS self-duality equations [28,29]. By considering axially symmetric configurations these equations reduce to (2.14) with λ = 2e 2 .…”

Section: Jhep02(2016)063mentioning

confidence: 99%

Galileon Higgs vortices

Chagoya

Tasinato

2016

J. High Energ. Phys.

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“…The only known exception is the very special case λ = 0 [13,14,15]. This is the so-called Bogomol'nyi-Prasad-Sommerfield (BPS) limit which deserves a special consideration.…”

Section: 'T Hooft-polyakov Ansatzmentioning

confidence: 99%

MULTIMONOPOLES AND CLOSED VORTICES IN SU(2) YANG-MILLS-HIGGS THEORY

Shnir¹

2004

Études on Theoretical Physics

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We review classical monopole solutions of the SU (2) Yang-Mills-Higgs theory. The first part is a pedagogical introduction into to the basic features of the celebrated 't Hooft -Polyakov monopole. In the second part we describe new classes of static axially symmetric solutions which generalise 't Hooft -Polyakov monopole. These configurations are either deformations of the topologically trivial sector or the sectors with different topological charges. In both situations we construct the solutions representing the chains of monopoles and antimonopoles in static equilibrium. The solutions of another type are closed vortices which are centred around the symmetry axis and form different bound systems. Configurations of the third type are monopoles bounded with vortices. We suggest classification of these solutions which is related with 2d Poincare index.

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“…We define the space L(P ) as 18) where M(X) is the space of meromorphic functions on X. This is a vector space.…”

Section: Moduli Of the Divisormentioning

confidence: 99%

“…Ref. [18] studied the stability of such dyons and proved that the class of dyons studied in [16] saturating the bound M = |Z| are stable against perturbations. The extremal Reissner-Nordström solutions are also expected to be stable.…”

Section: Reissner-nordström Black Holesmentioning

confidence: 99%

Partition Functions for Supersymmetric Black Holes

Manschot¹

2008

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Can one dent a dyon?

Abstract: We chow that the exact monopole and dyon solutions found by Prasad and Sommerfield are stable by proving that they are absolute minima of the energy.

Cited by 86 publications

References 3 publications

Galileon Higgs vortices

Galileon Higgs vortices

MULTIMONOPOLES AND CLOSED VORTICES IN SU(2) YANG-MILLS-HIGGS THEORY

Partition Functions for Supersymmetric Black Holes

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