Torus bundle

A torus bundle, in the sub-field of geometric topology in mathematics, is a kind of surface bundle over the circle, which in turn is a class of three-manifolds.

To obtain a torus bundle: let ${\displaystyle f}$ be an orientation-preserving homeomorphism of the two-dimensional torus ${\displaystyle T}$ to itself. Then the three-manifold ${\displaystyle M(f)}$ is obtained by

• taking the Cartesian product of ${\displaystyle T}$ and the unit interval and
• gluing one component of the boundary of the resulting manifold to the other boundary component via the map ${\displaystyle f}$.

Then ${\displaystyle M(f)}$ is the torus bundle with monodromy ${\displaystyle f}$.

For example, if ${\displaystyle f}$ is the identity map (i.e., the map which fixes every point of the torus) then the resulting torus bundle ${\displaystyle M(f)}$ is the three-torus: the Cartesian product of three circles.

Seeing the possible kinds of torus bundles in more detail requires an understanding of William Thurston's geometrization program. Briefly, if ${\displaystyle f}$ is finite order, then the manifold ${\displaystyle M(f)}$ has Euclidean geometry. If ${\displaystyle f}$ is a power of a Dehn twist then ${\displaystyle M(f)}$ has Nil geometry. Finally, if ${\displaystyle f}$ is an Anosov map then the resulting three-manifold has Sol geometry.

These three cases exactly correspond to the three possibilities for the absolute value of the trace of the action of ${\displaystyle f}$ on the homology of the torus: either less than two, equal to two, or greater than two.

• Jeffrey R. Weeks (2002). The Shape of Space (Second ed.). Marcel Dekker, Inc.. ISBN 978-0824707095. https://archive.org/details/shapeofspace0000week. 

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