SO(2,n)-compatible embeddings of conformally flat n-dimensional submanifolds in Rn+2
Abstract
We describe embeddings of n-dimensional Lorentzian manifolds, including Friedmann-Lema\itre-Robertson-Walker spaces, in Rn+2 such that the metrics of the submanifolds are inherited by a restriction from that of Rn+2, and the action of the linear group SO(2, n) of the ambient space reduces to conformal transformations on the submanifolds.
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