On the steady states of the spherically symmetric Einstein-Vlasov system
Abstract
Using both numerical and analytical tools we study various features of static, spherically symmetric solutions of the Einstein-Vlasov system. In particular, we investigate the possible shapes of their mass-energy density and find that they can be multi-peaked, we give numerical evidence and a partial proof for the conjecture that the Buchdahl inequality r > 0 2 m(r)/r < 8/9, m(r) the quasi-local mass, holds for all such steady states--both isotropic and anisotropic--, and we give numerical evidence and a partial proof for the conjecture that for any given microscopic equation of state--both isotropic and anisotropic--the resulting one-parameter family of static solutions generates a spiral in the radius-mass diagram.
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