In mathematics, the Borel–Weil–Bott theorem is a basic result in the representation theory of Lie groups, showing how a family of representations can be obtained from holomorphic sections of certain complex vector bundles, and, more generally, from higher sheaf cohomology groups associated to such bundles. It is built on the earlier Borel–Weil theorem of Armand Borel and André Weil, dealing just with the space of sections (the zeroth cohomology group), the extension to higher cohomology groups being provided by Raoul Bott. One can equivalently, through Serre's GAGA, view this as a result in complex algebraic geometry in the Zariski topology.
Let be a semisimple Lie group or algebraic group over
C
Hi(G/B,Lλ)
Lλ
We first need to describe the Weyl group action centered at
-\rho
w*λ:=w(λ+\rho)-\rho
\mu(\alpha\vee)\geq0
Given an integral weight, one of two cases occur:
w\inW
w*λ
w\inW
w*λ=λ
w\inW
w*λ
Hi(G/B,Lλ)=0
and in the second case, we have
Hi(G/B,Lλ)=0
i ≠ \ell(w)
H(G/B,Lλ)
w*λ
It is worth noting that case (1) above occurs if and only if
(λ+\rho)(\beta\vee)=0
e\inW
For example, consider, for which is the Riemann sphere, an integral weight is specified simply by an integer, and . The line bundle is {lO}(n)
, whose sections are the homogeneous polynomials of degree (i.e. the binary forms). As a representation of, the sections can be written as, and is canonically isomorphic to .
This gives us at a stroke the representation theory of
ak{sl}2(C)
\Gamma({lO}(1))
\Gamma({lO}(n))
ak{sl}2(C)
\begin{align} H&=x
| \partial | -y | |
| \partialx |
| \partial | |
| \partialy |
,\\[5pt] X&=x
| \partial | |
| \partialy |
,\\[5pt] Y&=y
| \partial | |
| \partialx |
. \end{align}
One also has a weaker form of this theorem in positive characteristic. Namely, let be a semisimple algebraic group over an algebraically closed field of characteristic
p>0
Hi(G/B,Lλ)=0
w*λ
w\inW
More explicitly, let be a dominant integral weight; then it is still true that
Hi(G/B,Lλ)=0
i>0
Hi(G/B,Lλ)
C
The Borel–Weil theorem provides a concrete model for irreducible representations of compact Lie groups and irreducible holomorphic representations of complex semisimple Lie groups. These representations are realized in the spaces of global sections of holomorphic line bundles on the flag manifold of the group. The Borel–Weil–Bott theorem is its generalization to higher cohomology spaces. The theorem dates back to the early 1950s and can be found in and .
The theorem can be stated either for a complex semisimple Lie group or for its compact form . Let be a connected complex semisimple Lie group, a Borel subgroup of, and the flag variety. In this scenario, is a complex manifold and a nonsingular algebraic . The flag variety can also be described as a compact homogeneous space, where is a (compact) Cartan subgroup of . An integral weight determines a holomorphic line bundle on and the group acts on its space of global sections,
\Gamma(G/B,Lλ).
The Borel–Weil theorem states that if is a dominant integral weight then this representation is a holomorphic irreducible highest weight representation of with highest weight . Its restriction to is an irreducible unitary representation of with highest weight, and each irreducible unitary representation of is obtained in this way for a unique value of . (A holomorphic representation of a complex Lie group is one for which the corresponding Lie algebra representation is complex linear.)
The weight gives rise to a character (one-dimensional representation) of the Borel subgroup, which is denoted . Holomorphic sections of the holomorphic line bundle over may be described more concretely as holomorphic maps
f:G\toCλ:f(gb)=\chiλ(b-1)f(g)
for all and .
The action of on these sections is given by
g ⋅ f(h)=f(g-1h)
for .
Let be the complex special linear group, with a Borel subgroup consisting of upper triangular matrices with determinant one. Integral weights for may be identified with integers, with dominant weights corresponding to nonnegative integers, and the corresponding characters of have the form
\chin \begin{pmatrix} a&b\\ 0&a-1\end{pmatrix}=an.
The flag variety may be identified with the complex projective line with homogeneous coordinates and the space of the global sections of the line bundle is identified with the space of homogeneous polynomials of degree on . For, this space has dimension and forms an irreducible representation under the standard action of on the polynomial algebra . Weight vectors are given by monomials
XiYn-i, 0\leqi\leqn
of weights, and the highest weight vector has weight .