Abstract
We study the quotients of -dimensional anti–de Sitter space by one-parameter subgroups of its isometry group for general n. We classify the different quotients up to conjugation by We find that the majority of the classes exist for all There are two special classes which appear in higher dimensions: one for and one for The description of the quotient in the majority of cases is thus a simple generalization of the quotients.
- Received 4 February 2004
DOI:https://doi.org/10.1103/PhysRevD.70.026002
©2004 American Physical Society