Cylindrically symmetric inhomogeneous dust collapse with a zero expansion component
Abstract
We investigate a class of cylindrically symmetric inhomogeneous -dust spacetimes which have a regular axis and some zero expansion component. For 0, we obtain new exact solutions to the Einstein equations and show that they are unique, within that class. For =0, we recover the Senovilla-Vera metric and show that it can be locally matched to an Einstein-Rosen type of exterior. Finally, we explore some consequences of the matching, such as trapped surface formation and gravitational radiation in the exterior.
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