Demazure module

In mathematics, a Demazure module, , introduced by Demazure (1974a, 1974b). is a submodule of a finite dimensional representation generated by an extremal weight space under the action of a Borel subalgebra. The Demazure character formula, introduced by Demazure (1974b, theorem 2), gives the characters of Demazure modules, and is a generalization of the Weyl character formula. The dimension of a Demazure module is a polynomial in the highest weight, called a Demazure polynomial.

The Demazure character formula was introduced by (Demazure 1974b, theorem 2). Victor Kac pointed out that Demazure's proof has a serious gap, as it depends on Demazure (1974a, Proposition 11, section 2), which is false. Anderson (1985) harvtxt error: no target: CITEREFAnderson1985 (help) gave a proof of Demazure's character formula using the work on the geometry of Schubert varieties by Ramanan & Ramanathan (1985) and Mehta & Ramanathan (1985). Joseph (1985) gave a proof for sufficiently large dominant highest weight modules using Lie algebra techniques. Kashiwara (1993) proved a refined version of the Demazure character formula that Littelmann (1995) conjectured (and proved in many cases).

The Demazure character formula is

${\displaystyle {\text{Ch}}(F(w\lambda ))=\Delta _{1}\Delta _{2}\cdots \Delta _{n}e^{\lambda }}$

Here:

• w is an element of the Weyl group, with reduced decomposition w=s₁...s_n as a product of reflections of simple roots.
• λ is a lowest weight, and e^λ the corresponding element of the group ring of the weight lattice.
• Ch(F(wλ)) is the character of the Demazure module F(wλ).
• P is the weight lattice, and Z[P] is its group ring.
• Δ_α for α a root is the endomorphism of the Z-module Z[P] defined by

${\displaystyle \Delta _{\alpha }(u)={\frac {u-s_{\alpha }u}{1-e^{-\alpha }}}}$

and Δ_j is Δ_α for α the root of s_j

• Andersen, H. H. (1985), "Schubert varieties and Demazure's character formula", Inventiones Mathematicae, 79 (3): 611–618, doi:10.1007/BF01388527, ISSN 0020-9910, MR782239
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• Littelmann, Peter (1995), "Crystal graphs and Young tableaux", Journal of Algebra, 175 (1): 65–87, doi:10.1006/jabr.1995.1175, ISSN 0021-8693, MR1338967
• Mehta, V. B.; Ramanathan, A. (1985), "Frobenius splitting and cohomology vanishing for Schubert varieties", Annals of Mathematics. Second Series, 122 (1): 27–40, doi:10.2307/1971368, ISSN 0003-486X, MR799251
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