Add to ORKGFor quantum group of affine type, Lusztig gave an explicit construction of the affine canonical basis by simple perverse sheaves. In this paper, we construct a bar-invariant basis by using a PBW basis arising from representations of the corresponding tame quiver. We prove that this bar-invariant basis coincides with Lusztig's canonical basis and obtain a concrete bijection between the elements in theses two bases. The index set of these bases is listed orderly by modules in preprojective, regular non-homogeneous, preinjective components and irreducible characters of symmetric groups. Our results are based on the work of Lin-Xiao-Zhang and closely related with the work of Beck-Nakajima. A crucial method in our construction is a generalizatio...
AbstractA new class of algebras has been introduced by Khovanov and Lauda and independently by Rouqu...
AbstractIn this paper we show that there is a link between the combinatorics of the canonical basis ...
Pursuing the similarity between the Kontsevich–Soibelman construction of the cohomological Hall alge...
AbstractThis is the continuation of [Y. Li, Affine quivers of type A˜n and canonical bases, math.QA/...
AbstractPBW type bases of the twisted generic composition algebras of the affine valued quivers are ...
Abstract. We use the monomial basis theory developed in [4] to present an elementary algebraic const...
This thesis is about the moduli spaces of representations of arbitrary quivers, i.e. possibly carryi...
summary:We construct bar-invariant $\mathbb {Z}[q^{\pm {1}/{2}}]$-bases of the quantum cluster algeb...
summary:We construct bar-invariant $\mathbb {Z}[q^{\pm {1}/{2}}]$-bases of the quantum cluster algeb...
Doctor of PhilosophyDepartment of MathematicsZongzhu LinA representation of a quiver [Gamma] over a ...
AbstractWe compare various bases of the quantum group U(sl^2) in the context of the Kronecker quiver...
A representation of a quiver Γ over a commutative ring R assigns an R-module to each vertex and an R...
82 pagesWe prove a series of conjectures of Enomoto and Kashiwara on canonical bases and branching r...
AbstractConsider the canonical isomorphism between the Ringel–Hall algebra H(Λ) and the positive par...
K-theoretic Hall algebras (KHAs) of quivers with potential $(Q,W)$ are a generalization of preprojec...
AbstractA new class of algebras has been introduced by Khovanov and Lauda and independently by Rouqu...
AbstractIn this paper we show that there is a link between the combinatorics of the canonical basis ...
Pursuing the similarity between the Kontsevich–Soibelman construction of the cohomological Hall alge...
AbstractThis is the continuation of [Y. Li, Affine quivers of type A˜n and canonical bases, math.QA/...
AbstractPBW type bases of the twisted generic composition algebras of the affine valued quivers are ...
Abstract. We use the monomial basis theory developed in [4] to present an elementary algebraic const...
This thesis is about the moduli spaces of representations of arbitrary quivers, i.e. possibly carryi...
summary:We construct bar-invariant $\mathbb {Z}[q^{\pm {1}/{2}}]$-bases of the quantum cluster algeb...
summary:We construct bar-invariant $\mathbb {Z}[q^{\pm {1}/{2}}]$-bases of the quantum cluster algeb...
Doctor of PhilosophyDepartment of MathematicsZongzhu LinA representation of a quiver [Gamma] over a ...
AbstractWe compare various bases of the quantum group U(sl^2) in the context of the Kronecker quiver...
A representation of a quiver Γ over a commutative ring R assigns an R-module to each vertex and an R...
82 pagesWe prove a series of conjectures of Enomoto and Kashiwara on canonical bases and branching r...
AbstractConsider the canonical isomorphism between the Ringel–Hall algebra H(Λ) and the positive par...
K-theoretic Hall algebras (KHAs) of quivers with potential $(Q,W)$ are a generalization of preprojec...
AbstractA new class of algebras has been introduced by Khovanov and Lauda and independently by Rouqu...
AbstractIn this paper we show that there is a link between the combinatorics of the canonical basis ...
Pursuing the similarity between the Kontsevich–Soibelman construction of the cohomological Hall alge...