Solvmanifold

In mathematics, a solvmanifold is a homogeneous space of a connected solvable Lie group. It may also be characterized as a quotient of a connected solvable Lie group by a closed subgroup. (Some authors also require that the Lie group be simply-connected, or that the quotient be compact.) A special class of solvmanifolds, nilmanifolds, was introduced by Malcev, who proved the first structural theorems. Properties of general solvmanifolds are similar, but somewhat more complicated.

Examples

Properties

Odd section

Let \mathfrak{g} be a real Lie algebra. It is called a complete Lie algebra if each map

ad(X): \mathfrak{g} \to \mathfrak{g}, X \in \mathfrak{g}

in its adjoint representation is hyperbolic, i.e. has real eigenvalues. Let G be a solvable Lie group whose Lie algebra \mathfrak{g} is complete. Then for any closed subgroup Γ of G, the solvmanifold G/Γ is a complete solvmanifold.

References

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