Reductive homogeneous Lorentzian manifolds
Abstract
We study homogeneous Lorentzian manifolds of a connected reductive Lie group modulo a connected reductive subgroup , under the assumption that is (almost) -effective and the isotropy representation is totally reducible. We show that the description of such manifolds reduces to the case of semisimple Lie groups . Moreover, we prove that such a homogeneous space is reductive. We describe all totally reducible subgroups of the Lorentz group and divide them into three types. The subgroups of Type I are compact, while the subgroups of Type II and Type III are non-compact. The explicit description of the corresponding homogeneous Lorentzian spaces of Type II and III (under some mild assumption) is given. We also show that the description of Lorentz homogeneous manifolds of Type I, reduces to the description of subgroups such that is an admissible manifold, i.e., an effective homogeneous manifold that admits an invariant Lorentzian metric. Whenever the subgroup is a maximal subgroup with these properties, we call such a manifold minimal admissible. We classify all minimal admissible homogeneous manifolds of a compact semisimple Lie group and describe all invariant Lorentzian metrics on them.
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Cite
@article{arxiv.2204.13433,
title = {Reductive homogeneous Lorentzian manifolds},
author = {Dmitri Alekseevsky and Ioannis Chrysikos and Anton Galaev},
journal= {arXiv preprint arXiv:2204.13433},
year = {2024}
}
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20 pages