Matching collapse and expansion across Matter Trapping surfaces in inhomogeneous models

Abstract

In the present work we examine the MTS, for the restriction to spherical dust plus , proving that it actually is a characteristic surface of the Cauchy problem (generated by its characteristic curves), which opens the possibility for infinite solutions. This translate as the MTS being a boundary between arbitrarily independent solutions, reminiscent of the Birkhoff theorem effects. This property is illustrated with combinations of 3 examples containing MTSs and (, Schwarzschild-de\,Sitter, Lema\itre-Tolman-Bondi-de\,Sitter: LTBdS -- i.e. the inhomogeneous, spherically symmetric ). The LTBdS model presents a static, stable MTS for the first time.