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The modified quantized enveloping algebra $\dot{\mathbf{U}}$ has a remarkable canonical basis, which was introduced by Lusztig. In this paper, we give an explicit description of all elements of the canonical basis of $\dot{\mathbf{U}}$ for…

Representation Theory · Mathematics 2014-06-24 Weideng Cui

Following Kashiwara's algebraic approach, we construct crystal bases and canonical bases for quantum supergroups with no isotropic odd roots and for their integrable modules.

Quantum Algebra · Mathematics 2014-11-24 Sean Clark , David Hill , Weiqiang Wang

In this paper, we study the structures of Schur algebra and Lusztig algebra associated to partial flag varieties of affine type D. We show that there is a subalgebra of Lusztig algebra and the quantum groups arising from this subalgebras…

Quantum Algebra · Mathematics 2024-03-08 Quanyong Chen , Zhaobing Fan

Let $U_{q}^{-}(\mathfrak g)$ be the negative half of a quantum Borcherds-Bozec algebra $U_{q}(\mathfrak g)$ and $V(\lambda)$ be the irreducible highest weight module with $\lambda \in P^{+}$. In this paper, we investigate the structures,…

Representation Theory · Mathematics 2024-04-02 Zhaobing Fan , Shaolong Han , Seok-Jin Kang , Young Rock Kim

We study representations of simply-laced Weyl groups which are equipped with canonical bases. Our main result is that for a large class of representations, the separable elements of the Weyl group $W$ act on these canonical bases by…

Representation Theory · Mathematics 2025-02-26 Fern Gossow , Oded Yacobi

This article gives conjecturally correct algorithms to construct canonical bases of the irreducible polynomial representations and the matrix coordinate rings of the nonstandard quantum groups in GCT4 and GCT7, and canonical bases of the…

Computational Complexity · Computer Science 2008-09-01 Ketan D. Mulmuley

In this paper we show that the Kazhdan-Lusztig polynomials (and, more generally, parabolic KL polynomials) for the group $S_n$ coincide with the coefficients of the canonical basis in $n$th tensor power of the fundamental representation of…

q-alg · Mathematics 2008-02-03 Igor Frenkel , Mikhail Khovanov , Alexander Kirillov

It is known that the set of irreducible components of nilpotent varieties provides a geometric realization of the crystal basis for quantum groups. For each reduced expression of a Weyl group element, Gei{\ss}, Leclerc and Schr\"{o}er has…

Quantum Algebra · Mathematics 2012-10-30 Yong Jiang

We relate quantum degree cones, parametrizing PBW degenerations of quantized enveloping algebras, to (negative tight monomial) cones introduced by Lusztig in the study of monomials in canonical bases, to K-theoretic cones for quiver…

Quantum Algebra · Mathematics 2019-12-06 Xin Fang , Ghislain Fourier , Markus Reineke

Geiss-Leclerc-Schroer defined the cluster algebra structure on the coordinate ring $C[N(w)]$ of the unipotent subgroup, associated with a Weyl group element $w$ and they proved cluster monomials are contained in Lusztig's dual semicanonical…

Quantum Algebra · Mathematics 2015-01-14 Yoshiyuki Kimura

We obtain a family of explicit "polyhedral" combinatorial expressions for multiplicities in the tensor product of two simple finite-dimensional modules over a complex semisimple Lie algebra. Here "polyhedral" means that the multiplicity in…

Representation Theory · Mathematics 2007-05-23 Arkady Berenstein , Andrei Zelevinsky

We develop a general theory of canonical bases for quantum symmetric pairs $(\mathbf{U}, \mathbf{U}^\imath)$ with parameters of arbitrary finite type. We construct new canonical bases for the simple integrable $\mathbf{U}$-modules and their…

Quantum Algebra · Mathematics 2018-08-14 Huanchen Bao , Weiqiang Wang

This paper is a continuation of [5]. Using the root categories, we define the compact real forms of the complex semisimple Lie algebras, and maximal compact subgroups of the Chevalley groups over $\mathbb{C}$. In [7], Lusztig used the…

Representation Theory · Mathematics 2026-02-26 Buyan Li , Jie Xiao

We introduce the language of multiplier Hopf algebra in the context of positive representations of split real quantum groups, and discuss its applications with a continuous version of Lusztig-Kashiwara's canonical basis, which may provide a…

Representation Theory · Mathematics 2014-05-30 Ivan Chi-Ho Ip

We construct a monomial basis of a quantum affine algebra of simply-laced type, associated to the PBW basis of Beck-Nakajima. We show that there exists a simple algorithm of computing canonical basis in terms of the monomial basis. We…

Quantum Algebra · Mathematics 2026-05-19 Toshiaki Shoji , Zhiping Zhou

We construct a crystal basis for the negative half of the quantum group U associated to the standard super Cartan datum of gl(m|1), which is compatible with known crystals on Kac modules and simple modules. We show that these crystals admit…

Quantum Algebra · Mathematics 2016-05-16 Sean Clark

The canonical quantization on a single light front is performed for the Abelian gauge fields with the Weyl gauge coupled with fermion field currents. The analysis is carried separately for 1+1 dimensions and for higher dimensions. The Gauss…

High Energy Physics - Theory · Physics 2007-05-23 Jerzy A. Przeszowski

In this largely expository article we present an elementary construction of Lusztig's canonical basis in type ADE. The method, which is essentially Lusztig's original approach, is to use the braid group to reduce to rank two calculations.…

Representation Theory · Mathematics 2016-06-07 Peter Tingley

Let $G$ be a complex simply connected semisimple Lie group, and let $B_V$ be the canonical base of a Weyl module $V$ of $G$. We calculate explicitely the action of the longest element $w_0$ of the Weyl group on $B_V$ in terms of…

Representation Theory · Mathematics 2007-05-23 Sophie Morier-Genoud

In 2012 Raghavan, Samuel, and Subrahmanyam showed that the Kazhdan--Lusztig basis for the Iwahori--Hecke algebra in type A provides a ``canonical'' basis for the centraliser algebra of the Schur algebra acting on tensor space. In 2022 the…

Representation Theory · Mathematics 2024-06-19 C. Bowman , S. Doty , S. Martin