Stiefel manifold

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In mathematics, the Stiefel manifold V_k(Rⁿ) is the set of all orthonormal k-frames in Rⁿ. That is, it is the set of ordered k-tuples of orthonormal vectors in Rⁿ. Likewise one can define the complex Stiefel manifold V_k(Cⁿ) of orthonormal k-frames in Cⁿ and the quaternionic Stiefel manifold V_k(Hⁿ) of orthonormal k-frames in Hⁿ. More generally, the construction applies to any real, complex, or quaternionic inner product space.

In some contexts, a non-compact Stiefel manifold is defined as the set of all linearly independent k-frames in Rⁿ, Cⁿ, or Hⁿ.

1 Topology
2 As a homogeneous space
3 Special cases
4 As a principal bundle
5 See also
6 References

[edit] Topology

Let F stand for R, C, or H. The Stiefel manifold V_k(Fⁿ) can be thought of as a set of n × k matrices by writing a k-frame as a matrix of k column vectors in Fⁿ. The orthonormality condition is expressed by A*A = 1 where A* denotes the conjugate transpose of A and 1 denotes the k × k identity matrix. We then have

$V_k(\mathbb F^n) = \left\{A \in \mathbb F^{n\times k} : A^{\ast}A = 1\right\}.$

The topology on V_k(Fⁿ) is the subspace topology inherited from F^n×k. With this topology V_k(Fⁿ) is a compact manifold whose dimension is given by

$\dim V_k(\mathbb R^n) = nk - \frac{1}{2}k(k+1)$

$\dim V_k(\mathbb C^n) = 2nk - k^2$

$\dim V_k(\mathbb H^n) = 4nk - k(2k-1)$

[edit] As a homogeneous space

Each of the Stiefel manifolds V_k(Fⁿ) can be viewed as a homogeneous space for the action of a classical group in a natural manner.

Every orthogonal transformation of a k-frame in Rⁿ results in another k-frame, and any two k-frames are related by some orthogonal transformation. In other words, the orthogonal group O(n) acts transitively on V_{k_{(Rⁿ). The stabilizer subgroup of a given frame is the subgroup isomorphic to O(n−k) which acts nontrivially on the orthogonal complement of the space spanned by that frame.}}

_{Likewise the unitary group U(n) acts transitively on V_{k_{(Cⁿ) with stabilizer subgroup U(n−k) and the symplectic group Sp(n) acts transitively on V_{k_{(Hⁿ) with stabilizer subgroup Sp(n−k).}}}}}

_{In each case V_k(Fⁿ) can be viewed as a homogeneous space:}

$\begin{align} V_k(\mathbb R^n) &\cong \mbox{O}(n)/\mbox{O}(n-k)\\ V_k(\mathbb C^n) &\cong \mbox{U}(n)/\mbox{U}(n-k)\\ V_k(\mathbb H^n) &\cong \mbox{Sp}(n)/\mbox{Sp}(n-k) \end{align}$

When k = n, the corresponding action is free so that the Stiefel manifold V_n(Fⁿ) is a principal homogeneous space for the corresponding classical group.

When k is strictly less than n then the special orthogonal group SO(n) also acts transitively on V_k(Rⁿ) with stabilizer subgroup isomorphic to SO(n−k) so that

$V_k(\mathbb R^n) \cong \mbox{SO}(n)/\mbox{SO}(n-k)\qquad\mbox{for } k < n.$

The same holds for the action of the special unitary group on V_k(Cⁿ)

$V_k(\mathbb C^n) \cong \mbox{SU}(n)/\mbox{SU}(n-k)\qquad\mbox{for } k < n.$

[edit] Special cases

k = 1	$\begin{align} V_1(\mathbb R^n) &= S^{n-1}\\ V_1(\mathbb C^n) &= S^{2n-1}\\ V_1(\mathbb H^n) &= S^{4n-1} \end{align}$
k = n−1	$\begin{align} V_{n-1}(\mathbb R^n) &\cong \mathrm{SO}(n)\\ V_{n-1}(\mathbb C^n) &\cong \mathrm{SU}(n) \end{align}$
k = n	$\begin{align} V_{n}(\mathbb R^n) &\cong \mathrm O(n)\\ V_{n}(\mathbb C^n) &\cong \mathrm U(n)\\ V_{n}(\mathbb H^n) &\cong \mathrm{Sp}(n) \end{align}$

A 1-frame in Fⁿ is nothing but a unit vector, so the Stiefel manifold V₁(Fⁿ) is just the unit sphere in Fⁿ.

Given a 2-frame in Rⁿ, let the first vector define a point in Sⁿ⁻¹ and the second a unit tangent vector to the sphere at that point. In this way, the Stiefel manifold V₂(Rⁿ) may be identified with the unit tangent bundle to Sⁿ⁻¹.

When k = n or n−1 we saw in the previous section that V_k(Fⁿ) is a principal homogeneous space, and therefore diffeomorphic to the corresponding classical group. These are listed in the table at the right.

[edit] As a principal bundle

There is a natural projection

$p: V_k(\mathbb F^n) \to G_k(\mathbb F^n)$

from the Stiefel manifold V_k(Fⁿ) to the Grassmannian of k-planes in Fⁿ which sends a k-frame to the subspace spanned by that frame. The fiber over a given point P in G_k(Fⁿ) is the set of all orthonormal k-frames contained in the space P.

This projection has the structure of a principal G-bundle where G is the associated classical group of degree k. Take the real case for concreteness. There is a natural right action of O(k) on V_k(Rⁿ) which rotates a k-frame in the space it spans. This action is free but not transitive. The orbits of this action are precisely the orthonormal k-frames spanning a given k-dimensional subspace; that is, they are the fibers of the map p. Similar arguments hold in the complex and quaternionic cases.

We then have a sequence of principal bundles:

$\begin{align} \mathrm O(k) &\to V_k(\mathbb R^n) \to G_k(\mathbb R^n)\\ \mathrm U(k) &\to V_k(\mathbb C^n) \to G_k(\mathbb C^n)\\ \mathrm{Sp}(k) &\to V_k(\mathbb H^n) \to G_k(\mathbb H^n) \end{align}$

The vector bundles associated to these principal bundles via the natural action of G on F^k are just the tautological bundles over the Grassmannians. In other words, the Stiefel manifold V_k(Fⁿ) is the orthogonal, unitary, or symplectic frame bundle associated to the tautological bundle on a Grassmannian.

When one passes to the n → ∞ limit, these bundles become the universal bundles for the classical groups.

[edit] See also

Flag manifold

[edit] References

Hatcher, Allen (2002). Algebraic Topology. Cambridge University Press. ISBN 0-521-79540-0.
Husemoller, Dale (1994). Fibre Bundles, (3rd ed.), New York: Springer-Verlag. ISBN 0-387-94087-1.

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Categories: Differential geometry | Homogeneous spaces | Fiber bundles | Manifolds