Abstract
A model is set up for a homogeneous configuration having the equation of state of a liquid. The equation of motion for the configuration boundary is preserved. It is shown that the spatial curvature can alter during evolution and that the configuration type is dependent on r0/rg, in which r0 is the boundary at which the sign of the spatial curvature alters. It is found that there are configurations which collapse, ones which expand indefinitely, and ones whose final state is that of a static sphere described by the interior Schwarzschild solution.
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