Whitney embedding theorem

In mathematics, particularly in differential topology, there are two Whitney embedding theorems, named after Hassler Whitney:

A little about the proof

The general outline of the proof is to start with an immersion f : MR2m with transverse self-intersections. These are known to exist from Whitney's earlier work on the weak immersion theorem. Transversality of the double points follows from a general-position argument. The idea is to then somehow remove all the self-intersections. If M has boundary, one can remove the self-intersections simply by isotoping M into itself (the isotopy being in the domain of f), to a submanifold of M that does not contain the double-points. Thus, we are quickly led to the case where M has no boundary. Sometimes it is impossible to remove the double-points via an isotopy—consider for example the figure-8 immersion of the circle in the plane. In this case, one needs to introduce a local double point.

Introducing double-point.

Once one has two opposite double points, one constructs a closed loop connecting the two, giving a closed path in R2m. Since R2m is simply connected, one can assume this path bounds a disc, and provided 2m > 4 one can further assume (by the weak Whitney embedding theorem) that the disc is embedded in R2m such that it intersects the image of M only in its boundary. Whitney then uses the disc to create a 1-parameter family of immersions, in effect pushing M across the disc, removing the two double points in the process. In the case of the figure-8 immersion with its introduced double-point, the push across move is quite simple (pictured).

Cancelling opposite double-points.

This process of eliminating opposite sign double-points by pushing the manifold along a disc is called the Whitney Trick.

To introduce a local double point, Whitney created a family of immersions αm : RmR2m which are approximately linear outside of the unit ball, but containing a single double point. For m = 1 such an immersion is given by

\begin{cases}
\alpha : \mathbf{R}^1 \to \mathbf{R}^2 \\
\alpha(t)=\left(\frac{1}{1+t^2}, t - \frac{2t}{1+t^2}\right)
\end{cases}

Notice that if α is considered as a map to R3 like so:

\alpha(t) = \left( \frac{1}{1+t^2},t - \frac{2t}{1+t^2},0\right)

then the double point can be resolved to an embedding:

\beta(t,a) = \left(\frac{1}{(1+t^2)(1+a^2)},t - \frac{2t}{(1+t^2)(1+a^2)},\frac{ta}{(1+t^2)(1+a^2)}\right).

Notice β(t, 0) = α(t) and for a ≠ 0 then as a function of t, β(t, a) is an embedding.

For higher dimensions m, there are αm that can be similarly resolved in R2m+1. For an embedding into R5, for example, define

\alpha_2(t_1,t_2) = \left(\beta(t_1,t_2),t_2\right) =  \left(\frac{1}{(1+t_1^2)(1+t_2^2)},t_1 - \frac{2t_1}{(1+t_1^2)(1+t_2^2)},\frac{t_1t_2}{(1+t_1^2)(1+t_2^2)}, t_2 \right).

This process ultimately leads one to the definition:

\alpha_m(t_1,t_2,\cdots,t_m) = \left(\frac{1}{u},t_1 - \frac{2t_1}{u},  \frac{t_1t_2}{u}, t_2, \frac{t_1t_3}{u}, t_3, \cdots, \frac{t_1t_m}{u}, t_m \right),

where

u=(1+t_1^2)(1+t_2^2)\cdots(1+t_m^2).

The key properties of αm is that it is an embedding except for the double-point αm(1, 0, ... , 0) = αm(−1, 0, ... , 0). Moreover, for |(t1, ... , tm)| large, it is approximately the linear embedding (0, t1, 0, t2, ... , 0, tm).

Eventual consequences of the Whitney trick

The Whitney trick was used by Steve Smale to prove the h-cobordism theorem; from which follows the Poincaré conjecture in dimensions m ≥ 5, and the classification of smooth structures on discs (also in dimensions 5 and up). This provides the foundation for surgery theory, which classifies manifolds in dimension 5 and above.

Given two oriented submanifolds of complementary dimensions in a simply connected manifold of dimension ≥ 5, one can apply an isotopy to one of the submanifolds so that all the points of intersection have the same sign.

History

The occasion of the proof by Hassler Whitney of the embedding theorem for smooth manifolds is said (rather surprisingly) to have been the first complete exposition of the manifold concept precisely because it brought together and unified the differing concepts of manifolds at the time: no longer was there any confusion as to whether abstract manifolds, intrinsically defined via charts, were any more or less general than manifold extrinsically defined as submanifolds of Euclidean space. See also the history of manifolds and varieties for context.

Sharper results

Although every n-manifold embeds in R2n, one can frequently do better. Let e(n) denote the smallest integer so that all compact connected n-manifolds embed in Re(n). Whitney's strong embedding theorem states that e(n) ≤ 2n. For n = 1, 2 we have e(n) = 2n, as the circle and the Klein bottle show. More generally, for n = 2k we have e(n) = 2n, as the 2k-dimensional real projective space show. Whitney's result can be improved to e(n) ≤ 2n − 1 unless n is a power of 2. This is a result of HaefligerHirsch (n > 4) and C.T.C. Wall (n = 3); these authors used important preliminary results and particular cases proved by M. Hirsch, W. Massey, S. Novikov and V. Rokhlin.[1] At present the function e is not known in closed-form for all integers (compare to the Whitney immersion theorem, where the analogous number is known).

Restrictions on manifolds

One can strengthen the results by putting additional restrictions on the manifold. For example, the n-sphere always embeds in Rn + 1 – which is the best possible (closed n-manifolds cannot embed in Rn). Any compact orientable surface and any compact surface with non-empty boundary embeds in R3, though any closed non-orientable surface needs R4.

If N is a compact orientable n-dimensional manifold, then N embeds in R2n − 1 (for n not a power of 2 the orientability condition is superfluous). For n a power of 2 this is a result of A. HaefligerM. Hirsch (n > 4) and F. Fang (n = 4); these authors used important preliminary results proved by J. Bo'echat-A. Haefliger, S. Donaldson, M. Hirsch and W. Massey.[1] Haefliger proved that if N is a compact n-dimensional k-connected manifold, then N embeds in R2n − k provided 2k + 3 ≤ n.[1]

Isotopy versions

A relatively 'easy' result is to prove that any two embeddings of a 1-manifold into R4 are isotopic. This is proved using general position, which also allows to show that any two embeddings of an n-manifold into R2n + 2 are isotopic. This result is an isotopy version of the weak Whitney embedding theorem.

Wu proved that for n ≥ 2, any two embeddings of an n-manifold into R2n + 1 are isotopic. This result is an isotopy version of the strong Whitney embedding theorem.

As an isotopy version of his embedding result, Haefliger proved that if N is a compact n-dimensional k-connected manifold, then any two embeddings of N into R2n − k + 1 are isotopic provided 2k + 2 ≤ n. The dimension restriction 2k + 2 ≤ n is sharp: Haefliger went on to give examples of non-trivially embedded 3-spheres in R6 (and, more generally, (2d − 1)-spheres in R3d). See further generalizations.

See also

Notes

  1. 1 2 3 See section 2 of Skopenkov (2008)

References

External links

This article is issued from Wikipedia - version of the Thursday, February 25, 2016. The text is available under the Creative Commons Attribution/Share Alike but additional terms may apply for the media files.