Hiroshi Naruse scite author profile

Abstract. We describe the torus-equivariant cohomology ring of isotropic Grassmannians by using a localization map to the torus fixed points. We present two types of formulas for equivariant Schubert classes of these homogeneous spaces. The first formula involves combinatorial objects which we call "excited Young diagrams" and the second one is written in terms of factorial Schur Q-or P -functions. As an application, we give a Giambelli-type formula for the equivariant Schubert classes. We also give combinatorial and Pfaffian formulas for the multiplicity of a singular point in a Schubert variety.

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Double Schubert polynomials for the classical groups

Ikeda

Mihalcea

Naruse

2011

Advances in Mathematics

144

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For each infinite series of the classical Lie groups of type B, C or D, we introduce a family of polynomials parametrized by the elements of the corresponding Weyl group of infinite rank. These polynomials represent the Schubert classes in the equivariant cohomology of the appropriate flag variety. They satisfy a stability property, and are a natural extension of the (single) Schubert polynomials of Billey and Haiman, which represent non-equivariant Schubert classes. They are also positive in a certain sense, and when indexed by maximal Grassmannian elements, or by the longest element in a finite Weyl group, these polynomials can be expressed in terms of the factorial analogues of Schur's Qor P -functions defined earlier by Ivanov.

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K-theoretic analogues of factorial SchurP- andQ-functions

Ikeda

Naruse

2013

Advances in Mathematics

114

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Industrial Applications of the BOTDR Optical Fiber Strain Sensor

Ohno

Naruse

Kihara

et al. 2001

Optical Fiber Technology

212

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Degeneracy loci classes in K-theory — determinantal and Pfaffian formula

Hudson

Ikeda

Matsumura

et al. 2017

Advances in Mathematics

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We prove a determinantal formula and Pfaffian formulas that respectively describe the K-theoretic degeneracy loci classes for Grassmann bundles and for symplectic Grassmann and odd orthogonal bundles. The former generalizes Damon-Kempf-Laksov's determinantal formula and the latter generalize Pragacz-Kazarian's formula for the Chow ring. As an application, we introduce the factorial GΘ/GΘ ′ -functions representing the torus equivariant K-theoretic Schubert classes of the symplectic and the odd orthogonal Grassmannians, which generalize the (double) theta polynomials of Buch-Kresch-Tamvakis and Tamvakis-Wilson.

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Hiroshi Naruse

Excited Young diagrams and equivariant Schubert calculus

Double Schubert polynomials for the classical groups

K-theoretic analogues of factorial SchurP- andQ-functions

Industrial Applications of the BOTDR Optical Fiber Strain Sensor

Degeneracy loci classes in K-theory — determinantal and Pfaffian formula

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