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Related papers: Quantum Grothendieck polynomials

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We study the algebraic aspects of equivariant quantum cohomology algebra of the flag manifold. We introduce and study the quantum double Schubert polynomials, which are the Lascoux-Schutzenberger type representatives of the equivariant…

q-alg · Mathematics 2008-02-03 Anatol N. Kirillov , Toshiaki Maeno

Quantum K-theory is a K-theoretic version of quantum cohomology, which was recently defined by Y.-P. Lee. Based on a presentation for the quantum K-theory of the classical flag variety Fl_n, we define and study quantum Grothendieck…

Combinatorics · Mathematics 2007-05-23 C. Lenart , T. Maeno

We give a combinatorial Chevalley formula for an arbitrary weight, in the torus-equivariant K-theory of semi-infinite flag manifolds, which is expressed in terms of the quantum alcove model. As an application, we prove the Chevalley formula…

Combinatorics · Mathematics 2019-12-02 Cristian Lenart , Satoshi Naito , Daisuke Sagaki

In our previous paper, we gave a presentation of the torus-equivariant quantum $K$-theory ring $QK_{H}(Fl_{n+1})$ of the (full) flag manifold $Fl_{n+1}$ of type $A_{n}$ as a quotient of a polynomial ring by an explicit ideal. In this paper,…

Quantum Algebra · Mathematics 2023-05-30 Toshiaki Maeno , Satoshi Naito , Daisuke Sagaki

We give a Chevalley formula for an arbitrary weight for the torus-equivariant $K$-group of semi-infinite flag manifolds, which is expressed in terms of the quantum alcove model. As an application, we prove the Chevalley formula for an…

Combinatorics · Mathematics 2024-02-23 Cristian Lenart , Satoshi Naito , Daisuke Sagaki

A GL$(n)$ quantum integrable system generalizing the asymmetric five vertex spin chain is shown to encode the ring relations of the equivariant quantum cohomology and equivariant quantum K-theory ring of flag varieties. We also show that…

Mathematical Physics · Physics 2025-04-16 Jirui Guo

We study the back stable $K$-theory Schubert calculus of the infinite flag variety. We define back stable (double) Grothendieck polynomials and double $K$-Stanley functions and establish coproduct expansion formulae. Applying work of…

Combinatorics · Mathematics 2021-08-24 Thomas Lam , Seung Jin Lee , Mark Shimozono

We establish an equivariant quantum Giambelli formula for partial flag varieties. The answer is given in terms of a specialization of universal double Schubert polynomials. Along the way, we give new proofs of the presentation of the…

Algebraic Geometry · Mathematics 2015-06-10 Dave Anderson , Linda Chen

The quantum double Schubert polynomials studied by Kirillov and Maeno, and by Ciocan-Fontanine and Fulton, are shown to represent Schubert classes in Kim's presentation of the equivariant quantum cohomology of the flag variety. We define…

Combinatorics · Mathematics 2011-08-26 Thomas Lam , Mark Shimozono

We study the equivariant K-group of the affine flag manifold with respect to the Borel group action. We prove that the structure sheaf of the (infinite-dimensional) Schubert variety in the K-group is represented by a unique polynomial,…

Algebraic Geometry · Mathematics 2019-12-19 Masaki Kashiwara , Mark Shimozono

The purpose of this paper is to prove a Pieri-type multiplication formula for quantum Grothendieck polynomials, which was conjectured by Lenart-Maeno. This formula would enable us to compute explicitly the quantum product of two arbitrary…

Quantum Algebra · Mathematics 2024-06-26 Satoshi Naito , Daisuke Sagaki

We prove an identity for (torus-equivariant) 3-point, genus 0, $K$-theoretic Gromov-Witten invariants of flag manifolds $G/P$, which can be thought of as a replacement for the ``divisor axiom'' in their (torus-equivariant) quantum…

Quantum Algebra · Mathematics 2025-11-03 Cristian Lenart , Satoshi Naito , Daisuke Sagaki , Leonardo C. Mihalcea , Weihong Xu

We show that the equivariant small quantum $K$-group of a partial flag manifold is a quotient of that of the full flag manifold in a way that respects the Schubert classes. This is a $K$-theoretic analogue of the parabolic version of…

Algebraic Geometry · Mathematics 2026-04-24 Syu Kato

The quantum cohomology algebra of the (full) flag manifold is a fundamental example in quantum cohomology theory, with connections to combinatorics, algebraic geometry, and integrable systems. Using a differential geometric approach, we…

Differential Geometry · Mathematics 2007-05-23 A. Amarzaya , M. A. Guest

We prove a type-uniform Chevalley formula for multiplication with divisor classes in the equivariant quantum $K$-theory ring of any cominuscule flag variety $G/P$. We also prove that multiplication with divisor classes determines the…

Algebraic Geometry · Mathematics 2017-06-12 Anders S. Buch , Pierre-Emmanuel Chaput , Leonardo C. Mihalcea , Nicolas Perrin

The aim of this paper is to describe the equivariant and ordinary Grothendieck ring and the equivariant and ordinary topological $K$-ring of flag Bott manifolds of general Lie type. This will generalize the results on the equivariant and…

Algebraic Topology · Mathematics 2024-06-18 Bidhan Paul , Vikraman Uma

We give a purely geometric explanation of the coincidence between the Coulomb Branch equations for the 3D GLSM describing the quantum $K$-theory of a flag variety, and the Bethe Ansatz equations of the 5-vertex lattice model. In doing so,…

Algebraic Geometry · Mathematics 2025-09-16 Irit Huq-Kuruvilla

The (small) quantum cohomology ring of a flag manifold F encodes enumerative geometry of rational curves on F. We give a proof of the presentation of the ring and of a quantum Giambelli formula, which is more direct and geometric than the…

Algebraic Geometry · Mathematics 2007-05-23 Linda Chen

Kirillov and Naruse have constructed double Grothendieck polynomials to represent the equivariant K-theory classes of Schubert varieties in the complete flag manifolds of types B, C, and D. We derive a recursive formula for these…

Representation Theory · Mathematics 2025-12-23 Eric Marberg

We consider equivariant integrals on flag manifolds of type $A$. Using a computational method inspired by the theory of wall-crossing formulas by Takuro Mochizuki, we re-prove residue formulas for equivariant integrals given by Weber and…

Algebraic Geometry · Mathematics 2024-07-25 Ryo Ohkawa
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