On the stability of scalar-vacuum space-times

We study the stability of static, spherically symmetric solutions to the Einstein equations with a scalar field as the source. We describe a general methodology of studying small radial perturbations of scalar-vacuum configurations with arbitrary potentials V(φ) and in particular space-times with throats (including wormholes), which are possible if the scalar is phantom. At such a throat, the effective potential for perturbations Veff has a positive pole (a potential wall) that prevents a complete perturbation analysis. We show that, generically, (i) Veff has precisely the form required for regularization by the known S-deformation method, and (ii) a solution with the regularized potential leads to regular scalar field and metric perturbations of the initial configuration. The well-known conformal mappings make these results also applicable to scalar-tensor and f(R) theories of gravity. As a particular example, we prove the instability of all static solutions with both normal and phantom scalars and V(φ) ≡ 0 under spherical perturbations. We thus confirm the previous results on the unstable nature of anti-Fisher wormholes and Fisher’s singular solution and prove the instability of other branches of these solutions including the anti-Fisher “cold black holes.”. © Springer-Verlag / Società Italiana di Fisica 2011.

Authors
Bronnikov K.A. 1, 2 , Fabris J.C.3 , Zhidenko A.4
Publisher
Springer New York LLC
Number of issue
11
Language
English
Pages
1-12
Status
Published
Number
1791
Volume
71
Year
2011
Organizations
  • 1 Center for Gravitation and Fundamental Metrology, VNIIMS, Ozyornaya 46, Moscow, 119361, Russian Federation
  • 2 Institute of Gravitation and Cosmology, PFUR, ul. Miklukho-Maklaya 6, Moscow, 117198, Russian Federation
  • 3 Departamento de Física, Universidade Federal do Espírito Santo, Avenida Fernando Ferrari 514, Vitória, ES, 29075-910, Brazil
  • 4 Centro de Matemática, Computação e Cognição, Universidade Federal do ABC, Rua Santa Adélia, 166Santo André, SP 09210-170, Brazil
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