Litcius/Paper detail

The simplest wormhole in Rastall and k-essence theories

Kirill A. Bronnikov, Vinícius A. G. Barcellos, Laura P. de Carvalho, Júlio C. Fabris

2021The European Physical Journal C19 citationsDOIOpen Access PDF

Abstract

Abstract The geometry of the Ellis–Bronnikov wormhole is implemented in the Rastall and k-essence theories of gravity with a self-interacting scalar field. The form of the scalar field potential is determined in both cases. A stability analysis with respect to spherically symmetric time-dependent perturbations is carried out, and it shows that in k-essence theory the wormhole is unstable, like the original version of this geometry supported by a massless phantom scalar field in general relativity. In Rastall’s theory, it turns out that a perturbative approach reveals the same inconsistency that was found previously for black hole solutions: time-dependent perturbations of the static configuration prove to be excluded by the equations of motion, and the wormhole is, in this sense, stable under spherical perturbations.

Topics & Concepts

WormholePhysicsScalar fieldMassless particleScalar (mathematics)Classical mechanicsMathematical physicsTheoretical physicsGravitationScalar theories of gravitationField (mathematics)Differential geometryGeometryBlack hole (networking)Field equationStability (learning theory)General relativityBlack Holes and Theoretical PhysicsCosmology and Gravitation TheoriesNoncommutative and Quantum Gravity Theories