Maximally extended, explicit and regular coverings of the Schwarzschild - de Sitter vacua in arbitrary dimension

Abstract

Maximally extended, explicit and regular coverings of the Schwarzschild - de Sitter family of vacua are given, first in spacetime (generalizing a result due to Israel) and then for all dimensions D (assuming a D-2 sphere). It is shown that these coordinates offer important advantages over the well known Kruskal - Szekeres procedure.

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