Richardson Varieties in the Grassmannian
Abstract
The Richardson variety is defined to be the intersection of the Schubert variety and the opposite Schubert variety . For in the Grassmannian, we obtain a standard monomial basis for the homogeneous coordinate ring of . We use this basis first to prove the vanishing of , , , where is the restriction to 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 at any -fixed point ; and finally to derive a recursive formula for the multiplicity of at any -fixed point . Using the recursive formula, we show that the multiplicity of at is the product of the multiplicity of at and the multiplicity of at . This result allows us to generalize the Rosenthal-Zelevinsky determinantal formula for multiplicities at -fixed points of Schubert varieties to the case of Richardson varieties.
Keywords
Cite
@article{arxiv.math/0203278,
title = {Richardson Varieties in the Grassmannian},
author = {Victor Kreiman and V. Lakshmibai},
journal= {arXiv preprint arXiv:math/0203278},
year = {2007}
}
Comments
25 pages. To appear. A reference to Stanley's related work has been added to the introduction