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Smooth bubbling geometries without supersymmetry

Ibrahima Bah, Pierre Heidmann

2021Journal of High Energy Physics38 citationsDOIOpen Access PDF

Abstract

A bstract We construct the first smooth bubbling geometries using the Weyl formalism. The solutions are obtained from Einstein theory coupled to a two-form gauge field in six dimensions with two compact directions. We classify the charged Weyl solutions in this framework. Smooth solutions consist of a chain of Kaluza-Klein bubbles that can be neutral or wrapped by electromagnetic fluxes, and are free of curvature and conical singularities. We discuss how such topological structures are prevented from gravitational collapse without struts. When embedded in type IIB, the class of solutions describes D1-D5-KKm solutions in the non-BPS regime, and the smooth bubbling solutions have the same conserved charges as a static four-dimensional non-extremal Cvetic-Youm black hole.

Topics & Concepts

PhysicsCurvatureSupersymmetryGauge theoryGravitationGauge (firearms)Classical mechanicsEinsteinConical surfaceField (mathematics)Mathematical physicsTheoretical physicsClass (philosophy)Electromagnetic fieldBlack hole (networking)Type (biology)Einstein field equationsYang–Mills existence and mass gapVacuum solutionBrane cosmologyExtra dimensionsChain (unit)Topology (electrical circuits)Gravitational fieldTopological defectHorizonQuantum electrodynamicsSupergravityField equationBlack Holes and Theoretical PhysicsCosmology and Gravitation TheoriesNoncommutative and Quantum Gravity Theories
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