Weyl-Einstein structures on conformal solvmanifolds
Abstract
A conformal Lie group is a conformal manifold such that has a Lie group structure and is the conformal structure defined by a left-invariant metric on . We study Weyl-Einstein structures on conformal solvable Lie groups and on their compact quotients. In the compact case, we show that every conformal solvmanifold carrying a Weyl-Einstein structure is Einstein. We also show that there are no left-invariant Weyl-Einstein structures on non-abelian nilpotent conformal Lie groups, and classify them on conformal solvable Lie groups in the almost abelian case. Furthermore, we determine the precise list (up to automorphisms) of left-invariant metrics on simply connected solvable Lie groups of dimension 3 carrying left-invariant Weyl-Einstein structures.
Cite
@article{arxiv.2203.13642,
title = {Weyl-Einstein structures on conformal solvmanifolds},
author = {Viviana del Barco and Andrei Moroianu and Arthur Schichl},
journal= {arXiv preprint arXiv:2203.13642},
year = {2023}
}
Comments
27 pages