Richardson Varieties in the Grassmannian

Abstract

The Richardson variety Xwv is defined to be the intersection of the Schubert variety Xw and the opposite Schubert variety Xv. For Xwv in the Grassmannian, we obtain a standard monomial basis for the homogeneous coordinate ring of Xwv. We use this basis first to prove the vanishing of Hi(Xwv,Lm), i > 0 , m ≥ 0, where L is the restriction to Xwv of the ample generator of the Picard group of the Grassmannian; then to determine a basis for the tangent space and a criterion for smoothness for Xwv at any T-fixed point e; and finally to derive a recursive formula for the multiplicity of Xwv at any T-fixed point e. Using the recursive formula, we show that the multiplicity of Xwv at e is the product of the multiplicity of Xw at e and the multiplicity of Xv at e. This result allows us to generalize the Rosenthal-Zelevinsky determinantal formula for multiplicities at T-fixed points of Schubert varieties to the case of Richardson varieties.

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