Solvmanifold Explained
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 Anatoly Maltsev, who proved the first structural theorems. Properties of general solvmanifolds are similar, but somewhat more complicated.
Examples
, these manifolds belong to
Sol, one of the eight
Thurston geometries.
Properties
- A solvmanifold is diffeomorphic to the total space of a vector bundle over some compact solvmanifold. This statement was conjectured by George Mostow and proved by Louis Auslander and Richard Tolimieri.
- The fundamental group of an arbitrary solvmanifold is polycyclic.
- A compact solvmanifold is determined up to diffeomorphism by its fundamental group.
- Fundamental groups of compact solvmanifolds may be characterized as group extensions of free abelian groups of finite rank by finitely generated torsion-free nilpotent groups.
- Every solvmanifold is aspherical. Among all compact homogeneous spaces, solvmanifolds may be characterized by the properties of being aspherical and having a solvable fundamental group.
Completeness
Let
be a real
Lie algebra. It is called a
complete Lie algebra if each map
\operatorname{ad}(X)\colonak{g}\toak{g},X\inak{g}
in its adjoint representation is hyperbolic, i.e., it has only real eigenvalues. Let G be a solvable Lie group whose Lie algebra
is complete. Then for any closed subgroup
of
G, the solvmanifold
is a
complete solvmanifold
