Polynomials for GLp x GLq orbit closures in the flag variety
Abstract
The subgroup K=GLp x GLq of GLp+q acts on the (complex) flag variety GLp+q/B with finitely many orbits. We introduce a family of polynomials that specializes to representatives for cohomology classes of the orbit closures in the Borel model. We define and study K-orbit determinantal ideals to support the geometric naturality of these representatives. Using a modification of these ideals, we describe an analogy between two local singularity measures: the H-polynomials and the Kazhdan-Lusztig-Vogan polynomials.
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