1. On spherically symmetric solutions with horizon in model with multicomponent anisotropic fluid
- Author
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Heinz Dehnen and V. D. Ivashchuk
- Subjects
High Energy Physics - Theory ,Physics ,Antisymmetric relation ,Supergravity ,Horizon ,Astrophysics (astro-ph) ,FOS: Physical sciences ,Statistical and Nonlinear Physics ,Natural number ,General Relativity and Quantum Cosmology (gr-qc) ,Astrophysics ,General Relativity and Quantum Cosmology ,Section (fiber bundle) ,High Energy Physics - Theory (hep-th) ,Orthogonality ,Metric (mathematics) ,Black brane ,Mathematical Physics ,Mathematical physics - Abstract
A family of spherically symmetric solutions in the model with m-component anisotropic fluid is considered. The metric of the solution depends on parameters q_s, s = 1,...,m, relating radial pressures and the densities and contains (n -1)m parameters corresponding to Ricci-flat "internal space" metrics and obeying certain m(m-1)/2 ("orthogonality") relations. For q_s = 1 (for all s) and certian equations of state (p_i^s = \pm \rho^s) the metric coincides with the metric of intersecting black brane solution in the model with antisymmetric forms. A family of solutions with (regular) horizon corresponding to natural numbers q_s = 1,2,... is singled out. Certain examples of "generalized simulation" of intersecting M-branes in D=11 supergravity are considered. The post-Newtonian parameters \beta and \gamma corresponding to the 4-dimensional section of the metric are calculated., Comment: 16 pages, no figures
- Published
- 2004
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