Beilinson–Bernstein localization

In mathematics, especially in representation theory and algebraic geometry, the Beilinson–Bernstein localization theorem relates D-modules on flag varieties G/B to representations of the Lie algebra ${\displaystyle {\mathfrak {g}}}$ attached to a reductive group G. It was introduced by Beilinson & Bernstein (1981).

Extensions of this theorem include the case of partial flag varieties G/P, where P is a parabolic subgroup in Holland & Polo (1996) and a theorem relating D-modules on the affine Grassmannian to representations of the Kac–Moody algebra ${\displaystyle {\widehat {\mathfrak {g}}}}$ in Frenkel & Gaitsgory (2009).

Statement

Let G be a reductive group over the complex numbers, and B a Borel subgroup. Then there is an equivalence of categories^[1]

${\displaystyle {\mathcal {D}}{\text{-Mod}}(G/B)\ \simeq \ \left(U({\mathfrak {g}})/\ker \chi \right){\text{-Mod}}.}$

On the left is the category of D-modules on G/B. On the right χ is a homomorphism χ : Z(U(g)) → C from the centre of the universal enveloping algebra,

${\displaystyle Z(U({\mathfrak {g}}))\ \simeq \ {\text{Sym}}({\mathfrak {t}})^{W,\rho },}$

corresponding to the weight -ρ ∈ t^* given by minus half the sum over the positive roots of g. The above action of W on t^* = Spec Sym(t) is shifted so as to fix -ρ.

Twisted version

There is an equivalence of categories^[2]

${\displaystyle {\mathcal {D}}_{\lambda }{\text{-Mod}}(G/B)\ \simeq \ \left(U({\mathfrak {g}})/\ker \chi _{\lambda }\right){\text{-Mod}}.}$

for any λ ∈ t^* such that λ-ρ does not pair with any positive root α to give a nonpositive integer (it is "regular dominant"):

${\displaystyle (\lambda -\rho ,\alpha )\ \in \ \mathbf {C} -\mathbf {Z} _{\leq 0}.}$

Here χ is the central character corresponding to λ-ρ, and D_λ is the sheaf of rings on G/B formed by taking the *-pushforward of D_G/U along the T-bundle G/U → G/B, a sheaf of rings whose center is the constant sheaf of algebras U(t), and taking the quotient by the central character determined by λ (not λ-ρ).

Example: SL2

The Lie algebra of vector fields on the projective line P¹ is identified with sl₂, and

${\displaystyle U({\mathfrak {sl}}_{2})/\Omega \ \simeq \ {\mathcal {D}}(\mathbf {P} ^{1})}$

via

${\displaystyle (e,h,f)\ \mapsto \ (\partial _{z},-2z\partial _{z},z^{2}\partial _{z})}$

It can be checked linear combinations of three vector fields C ⊂ P¹ are the only vector fields extending to ∞ ∈ P¹. Here,

${\displaystyle \Omega \ =\ ef+fe+{\frac {1}{2}}h^{2}}$

is sent to zero.

The only finite dimensional sl₂ representation on which Ω acts by zero is the trivial representation k, which is sent to the constant sheaf, i.e. the ring of functions O ∈ D-Mod. The Verma module of weight 0 is sent to the D-Module δ supported at 0 ∈ P¹.

Each finite dimensional representation corresponds to a different twist.

References

1. Theorem 3.3.1, Beilinson, A. and Bernstein, J., 1993. A proof of Jantzen conjectures.
2. Theorem 3.3.1, Beilinson, A. and Bernstein, J., 1993. A proof of Jantzen conjectures.

• Beilinson, Alexandre; Bernstein, Joseph (1981), "Localisation de g-modules", Comptes Rendus de l'Académie des Sciences, Série I, 292 (1): 15–18, MR 0610137
• Holland, Martin P.; Polo, Patrick (1996), "K-theory of twisted differential operators on flag varieties", Inventiones Mathematicae, 123 (2): 377–414, doi:10.1007/s002220050033, MR 1374207, S2CID 189819773
• Frenkel, Edward; Gaitsgory, Dennis (2009), "Localization of ${\displaystyle {\mathfrak {g}}}$-modules on the affine Grassmannian", Ann. of Math. (2), 170 (3): 1339–1381, arXiv:math/0512562, doi:10.4007/annals.2009.170.1339, MR 2600875, S2CID 17597920
• Hotta, R. and Tanisaki, T., 2007. D-modules, perverse sheaves, and representation theory (Vol. 236). Springer Science & Business Media.
• Beilinson, A. and Bernstein, J., 1993. A proof of Jantzen conjectures. ADVSOV, pp. 1–50.