Double (manifold)

For the equipment used to connect two air cylinders in SCUBA diving, see Manifold (scuba).

In the subject of manifold theory in mathematics, if ${\displaystyle M}$ is a topological manifold with boundary, its double is obtained by gluing two copies of ${\displaystyle M}$ together along their common boundary. Precisely, the double is ${\displaystyle M\times \{0,1\}/\sim }$ where ${\displaystyle (x,0)\sim (x,1)}$ for all ${\displaystyle x\in \partial M}$.

If ${\displaystyle M}$ has a smooth structure, then its double can be endowed with a smooth structure thanks to a collar neighbourdhood.^{[1]: th. 9.29 & ex. 9.32}

Although the concept makes sense for any manifold, and even for some non-manifold sets such as the Alexander horned sphere, the notion of double tends to be used primarily in the context that ${\displaystyle \partial M}$ is non-empty and ${\displaystyle M}$ is compact.

Doubles bound

Given a manifold ${\displaystyle M}$ , the double of ${\displaystyle M}$  is the boundary of ${\displaystyle M\times [0,1]}$ . This gives doubles a special role in cobordism.

Examples

The n-sphere is the double of the n-ball. In this context, the two balls would be the upper and lower hemi-sphere respectively. More generally, if ${\displaystyle M}$  is closed, the double of ${\displaystyle M\times D^{k}}$  is ${\displaystyle M\times S^{k}}$ . Even more generally, the double of a disc bundle over a manifold is a sphere bundle over the same manifold. More concretely, the double of the Möbius strip is the Klein bottle.

If ${\displaystyle M}$  is a closed, oriented manifold and if ${\displaystyle M'}$  is obtained from ${\displaystyle M}$  by removing an open ball, then the connected sum ${\displaystyle M{\mathrel {\#}}-M}$  is the double of ${\displaystyle M'}$ .

The double of a Mazur manifold is a homotopy 4-sphere.^[2]

References

1. Lee, John (2012), Introduction to Smooth Manifolds, Graduate Texts in Mathematics, vol. 218, Springer, ISBN 9781441999825
2. Aitchison, I. R.; Rubinstein, J. H. (1984), "Fibered knots and involutions on homotopy spheres", Four-manifold theory (Durham, N.H., 1982), Contemp. Math., vol. 35, Amer. Math. Soc., Providence, RI, pp. 1–74, doi:10.1090/conm/035/780575, MR 0780575. See in particular p. 24.