Toric degenerations of Schubert varieties
Abstract
Let G be a simply connected semi-simple complex algebraic group. Fix a maximal torus T and a Borel subgroup B such that T⊂ B⊂ G. Let W the Weyl group of G relative to T. For any w in W, let Xw= BwB/B denote the Schubert variety corresponding to w. This talk is concerned with the following problem : Is there a flat family over Spec C[t], such that the general fiber is Xw and the special fiber is a toric variety? Our approach of the problem is based on the canonical/global base of Lusztig/Kashiwara and the so-called string parametrization of this base studied by P. Littelmann and made precise by A. Berenstein and A. Zelevinsky. Fix w in W and let P+ be the semigroup of dominant weights. For all λ in P+, let Lλ be the line bundle on G/B corresponding to λ. Then, the direct sum of global sections Rw:=λ∈ P+H0(Xw, Lλ) carries a natural structure of P+-graded C-algebra. Moreover, there exists a natural action of T on Rw. Our principal result can be stated as follows : There exists a filtration ( Fmw)m∈ N of Rw such that (i) for all m in N, Fmw is compatible with the P+-grading of Rw, (ii) for all m in N, Fmw is compatible with the action of T, (iii) the associated graded algebra is the C-algebra of the semigroup of integral points in a rational convex polyhedral cone. Equations for this cone were obtained by A. Berenstein and A. Zelevinski from w0-trails in fundamental Weyl modules of the Langlands dual of G. By standard arguments, the previous theorem gives a positive answer to the Degeneration Problem.
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