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157 results on '"Su, Xiuping"'

1. Generic bases of skew-symmetrizable affine type cluster algebras

Author

Mou, Lang and Su, Xiuping

Subjects
Mathematics - Representation Theory, 13F60
Abstract

Geiss, Leclerc and Schr\"oer introduced a class of 1-Iwanaga-Gorenstein algebras $H$ associated to symmetrizable Cartan matrices with acyclic orientations, generalizing the path algebras of acyclic quivers. They also proved that indecomposable rigid $H$-modules of finite projective dimension are in bijection with non-initial cluster variables of the corresponding Fomin-Zelevinsky cluster algebra. In this article, we prove in all affine types that their conjectural Caldero-Chapoton type formula on these modules coincide with the Laurent expression of cluster variables. By taking generic Caldero-Chapoton functions on varieties of modules of finite projective dimension, we obtain bases for affine type cluster algebras with full-rank coefficients containing all cluster monomials., Comment: 23 pages

Published
2024

2. Auslander algebras, flag combinatorics and quantum flag varieties

Author

Jensen, Bernt Tore and Su, Xiuping

Subjects
Mathematics - Representation Theory, Mathematics - Quantum Algebra
Abstract

Let $D$ be the Auslander algebra of $\mathbb{C}[t]/(t^n)$, which is quasi-hereditary, and $\mathcal{F}_\Delta$ the subcategory of good $D$-modules. For any $\mathsf{J}\subseteq[1, n-1]$, we construct a subcategory $\mathcal{F}_\Delta(\mathsf{J})$ of $\mathcal{F}_\Delta$ with an exact structure $\mathcal{E}$. We show that under $\mathcal{E}$, $\mathcal{F}_\Delta(\mathsf{J})$ is Frobenius stably 2-Calabi-Yau and admits a cluster structure consisting of cluster tilting objects. This then leads to an additive categorification of the cluster structure on the coordinate ring $\mathbb{C}[\operatorname{Fl}(\mathsf{J})]$ of the (partial) flag variety $\operatorname{Fl}(\mathsf{J})$. We further apply $\mathcal{F}_\Delta(\mathsf{J})$ to study flag combinatorics and the quantum cluster structure on the flag variety $\operatorname{Fl}(\mathsf{J})$. We show that weak and strong separation can be detected by the extension groups $\operatorname{ext}^1(-, -)$ under $\mathcal{E}$ and the extension groups $\operatorname{Ext}^1(-,-)$, respectively. We give a interpretation of the quasi-commutation rules of quantum minors and identify when the product of two quantum minors is invariant under the bar involution. The combinatorial operations of flips and geometric exchanges correspond to certain mutations of cluster tilting objects in $\mathcal{F}_\Delta(\mathsf{J})$. We then deduce that any (quantum) minor is reachable, when $\mathsf{J}$ is an interval. Building on our result for the interval case, Geiss-Leclerc-Schr\"{o}er's result on the quantum coordinate ring for the open cell of $\operatorname{Fl}(\mathsf{J})$ and Kang-Kashiwara-Kim-Oh's enhancement of that to the integral form, we prove that $\mathbb{C}_q[\operatorname{Fl}(\mathsf{J})]$ is a quantum cluster algebra over $\mathbb{C}[q,q^{-1}]$.

Published
2024

3. Categorification and mirror symmetry for Grassmannians

Author

Jensen, Bernt Tore, King, Alastair, and Su, Xiuping

Subjects
Mathematics - Representation Theory
Abstract

The homogeneous coordinate ring $\mathbb{C}[\operatorname{Gr}(k,n)]$ of the Grassmannian is a cluster algebra, with an additive categorification $\operatorname{CM}C$. Thus every $M\in\operatorname{CM}C$ has a cluster character $\Psi_M\in\mathbb{C}[\operatorname{Gr}(k,n)]$. The aim is to use the categorification to enrich Rietsch-Williams' mirror symmetry result that the Newton-Okounkov (NO) body/cone, made from leading exponents of functions in $\mathbb{C}[\operatorname{Gr}(k,n)]$ in an $\mathbb{X}$-cluster chart, can also be described by tropicalisation of the Marsh-Reitsch superpotential~$W$. For any cluster tilting object $T$, with endomorphism algebra $A$, we define two new cluster characters, a generalised partition function $\mathcal{P}^T_M\in\mathbb{C}[K(\operatorname{CM}A)]$ and a generalised flow polynomial $\mathcal{F}^T_M\in\mathbb{C}[K(\operatorname{fd}A)]$, related by a `dehomogenising' map $\operatorname{wt}\colon K(\operatorname{CM}A)\to K(\operatorname{fd}A)$. In the $\mathbb{X}$-cluster chart corresponding to $T$, the function $\Psi_M$ becomes $\mathcal{F}^T_M$ and thus its leading exponent is $\boldsymbol{\kappa}(T,M)$, an invariant introduced in earlier paper (and the image of the $g$-vector of $M$ under $\operatorname{wt}$). When $T$ mutates, $\mathcal{F}^T_M$ undergoes $\mathbb{X}$-mutation and $\boldsymbol{\kappa}(T,M)$ undergoes tropical $\mathbb{A}$-mutation. We then show that the monoid of $g$-vectors is saturated, and that this cone can be identified with the NO-cone, so the NO-body of Rietsch--Williams can be described in terms of $\boldsymbol{\kappa}(T,M)$. Furthermore, we adapt Rietsch-Williams' mirror symmetry strategy to find module-theoretic inequalities that determine the cone of $g$-vectors. Some of the machinery we develop works in a greater generality, which is relevant to the positroid subvarieties of $\operatorname{Gr}(k,n)$., Comment: 78 pages

Published
2024

4. Affine root systems, stable tubes and a conjecture by Geiss-Leclerc-Schr\'{o}er

Author

Lin, Zengqiang and Su, Xiuping

Subjects
Mathematics - Representation Theory, 16G10, 16G20, 16G70
Abstract

Associated to a symmetrisable Cartan matrix $C$, Geiss-Lerclerc-Schr\"{o}er constructed and studied a class of Iwanaga-Gorenstein algebras $H$. They proved a generalised version of Gabriel's Theorem, that is, the rank vectors of $\tau$-locally free $H$-modules are the positive roots of type $C$ when $C$ is of finite type, and conjectured that this is true for any $C$. In this paper, we look into this conjecture when $C$ is of affine type. We construct explicitly stable tubes, some of which have rigid mouth modules, while others not. We deduce that any positive root of type $C$ is the rank vector of some $\tau$-locally free $H$-module. However, the converse is not true in general. Our construction shows that there are $\tau$-locally free $H$-modules whose rank vectors are not roots, when $C$ is of type $\widetilde{\mathbb{B}}_n$, $\widetilde{\mathbb{CD}}_n$, $\widetilde{\mathbb{F}}_{41}$ and $\widetilde{\mathbb{G}}_{21}$, and so the conjecture fails in these four types.

Published
2024

6. The Auslander-Reiten quivers of string algebras of affine type $\widetilde{C}$ and a conjecture by Geiss-Leclerc-Schr\'{o}er

Author

Huang, Hua-Lin, Lin, Zengqiang, and Su, Xiuping

Subjects
Mathematics - Representation Theory, Mathematics - Rings and Algebras, 16G10, 16G20, 16G70
Abstract

In this paper, we study representations of certain string algebras, which are referred to as of affine type $\widetilde{C}$. We introduce minimal string modules and apply them to explicitly describe components of the Auslander-Reiten quivers of the string algebras and $\tau$-locally free modules defined by Geiss-Lerclerc-Schr\"{o}er. As an application, we prove Geiss-Leclerc-Schr\"{o}er's conjecture on the correspondence between positive roots of type $\widetilde{C}$ and $\tau$-locally free modules of the corresponding string algebras., Comment: 21 pages. Any comments are welcome

Published
2021

8. Categorification and the quantum Grassmannian

Author

Jensen, Bernt Tore, King, Alastair, and Su, Xiuping

Subjects
Mathematics - Representation Theory, Mathematics - Quantum Algebra
Abstract

In \cite{JKS} we gave an (additive) categorification of Grassmannian cluster algebras, using the category $\CM(A)$ of Cohen-Macaulay modules for a certain Gorenstein order $A$. In this paper, using a cluster tilting object in the same category $\CM(A)$, we construct a compatible pair $(B, L)$, which is the data needed to define a quantum cluster algebra. We show that when $(B, L)$ is defined from a cluster tilting object with rank 1 summands, this quantum cluster algebra is (generically) isomorphic to the corresponding quantum Grassmannian.

Published
2019

10. Degenerate 0-Schur algebras and Nil-Temperley-Lieb algebras

Author

Jensen, Bernt Tore, Su, Xiuping, and Yang, Guiyu

Subjects
Mathematics - Rings and Algebras, Mathematics - Quantum Algebra, Mathematics - Representation Theory
Abstract

In \cite{JS} Jensen and Su constructed 0-Schur algebras on double flag varieties. The construction leads to a presentation of 0-Schur algebras using quivers with relations and the quiver approach naturally gives rise to a new class of algebras. That is, the path algebras defined on the quivers of 0-Schur algebras with relations modified from the defining relations of 0-Schur algebras by a tuple of parameters $\ut$. In particular, when all the entries of $\ut$ are 1, we have 0-Schur algerbas. When all the entries of $\ut$ are zero, we obtain a class of degenerate 0-Schur algebras. We prove that the degenerate algebras are associated graded algebras and quotients of 0-Schur algebras. Moreover, we give a geometric interpretation of the degenerate algebras using double flag varieties, in the same spirit as \cite{JS}, and show how the centralizer algebras are related to nil-Hecke algebras and nil-Temperly-Lieb algebras

Published
2017

13. Existence of Richardson elements in seaweed Lie algebras of type $\mathbb{B}$, $\mathbb{C}$ and $\mathbb{D}$

Author

Jensen, Bernt Tore and Su, Xiuping

Subjects
Mathematics - Representation Theory, Mathematics - Rings and Algebras
Abstract

Seaweed Lie algebras are a natural generalisation of parabolic subalgebras of reductive Lie algebras. The well-known Richardson Theorem says that the adjoint action of a parabolic group has a dense open orbit in the nilpotent radical of its Lie algebra \cite{richardson}. We call elements in the open orbit Richardson elements. In \cite{JSY} together with Yu, we generalized Richardson's Theorem and showed that Richardson elements exist for seaweed Lie algebras of type $\mathbb{A}$. Using GAP, we checked that Richardson elements exist for all exceptional simple Lie algebras except $\mathbb{E}_8$, where we found a counterexample. In this paper, we complete the story on Richardson elements for seaweeds of finite type, by showing that they exist for any seaweed Lie algebra of type $\mathbb{B}$, $\mathbb{C}$ and $\mathbb{D}$. By decomposing a seaweed into a sum of subalgebras and analysing their stabilisers, we obtain a sufficient condition for the existence of Richarson elements. The sufficient condition is then verified using quiver representation theory. More precisely, using the categorical construction of Richardson elements in type $\mathbb{A}$, we prove that the sufficient condition is satisfied for all seaweeds of type $\mathbb{B}$, $\mathbb{C}$ and $\mathbb{D}$, except in two special cases, where we give a directproof.

Published
2016
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14. Presenting Hecke endomorphism algebras by Hasse quivers with relations

Author

Du, Jie, Jensen, Bernt Tore, and Su, Xiuping

Subjects
Mathematics - Quantum Algebra, Mathematics - Rings and Algebras, Mathematics - Representation Theory
Abstract

A Hecke endomorphism algebra is a natural generalisation of the $q$-Schur algebra associated with the symmetric group to a Coxeter group. For Weyl groups, B. Parshall, L. Scott and the first author \cite{DPS,DPS4} investigated the stratification structure of these algebras in order to seek applications to representations of finite groups of Lie type. In this paper we investigate the presentation problem for Hecke endomorphism algebras associated with arbitrary Coxeter groups. Our approach is to present such algebras by quivers with relations. If $R$ is the localisation of $\mathbb Z[q]$ at the polynomials with the constant term 1, the algebra can simply be defined by the so-called idempotent, sandwich and extended braid relations. As applications of this result, we first obtain a presentation of the 0-Hecke endomorphism algebra over $\mathbb{Z}$ and then develop an algorithm for presenting the Hecke endomorphism algebras over $\mathbb Z[q]$ by finding torsion relations. As examples, we determine the torsion relations required for all rank 2 groups and the symmetric group $\mathfrak{S}_4$.

Published
2015

15. Design and Self-Calibration Method of a Rope-Driven Cleaning Robot for Complex Glass Curtain Walls.

Author

Wang, Jingtian, Li, Yuao, Zhang, Minglu, Liu, Zonghou, Bai, Yiyang, Zhao, Zhengyang, Su, Xiuping, and Li, Manhong

Subjects
POSTURE, CURVED surfaces, ROBOT design & construction, ROBOTS, WINCHES
Abstract

Rope-driven robots are increasingly used to safely and efficiently clean complex glass curtain walls. However, continuous global cleaning is difficult for most robots because of their poor performance in overcoming obstacles and adapting to curved surfaces, and an inconvenient winch calibration on complex surfaces further burdens such work. This paper presents a 3-DOF rope-driven robot and a winch self-calibration method for efficient cleaning. The robot, by integrating a 5-rope parallel configuration, a self-adaptive cleaning body, and a self-compensating driving winch, is designed to perform continuous, compliant, and accurate spatial motion on curved walls with obstacles. By deducing the kinematic model, the constraint relationship related to orderly arranged winch positions, maneuverable body positions, and accessible rope lengths is established during the robot tracking 3D trajectory. Combining the established relationship, a series of regulations are formulated for easily acquiring body positions and rope lengths, and then a self-calibration method is proposed by accurately calculating winch positions without using professional instruments. Experimental results show that the robot can perform global and precise movement on complex glass surfaces. Applying the proposed method, the maximum winch calibration error is 6.6 mm, and the maximum body tracking error is controlled within 9.6 mm. [ABSTRACT FROM AUTHOR]

Published
2024
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17. Projective modules of $0$-Schur algebras

Author

Jensen, Bernt Tore, Su, Xiuping, and Yang, Guiyu

Subjects
Mathematics - Rings and Algebras, Mathematics - Quantum Algebra, Mathematics - Representation Theory
Abstract

We study the structure of the $0$-Schur algebra $S_0(n, r)$ following the geometric construction of $S_0(n, r)$ by Jensen and Su \cite{JS}. The main results are the construction and classification of indecomposable projective modules. In addition, we construct bases of these modules and their homomorphism spaces. We also give a filtration of projective modules, which leads to a decomposition of $S_0(n,r)$ into indecomposable left modules., Comment: The paper has been reorganised. Some results were removed and will appear elsewhere

Published
2013

19. A categorification of Grassmannian cluster algebras

Author

Jensen, Bernt Tore, King, Alastair, and Su, Xiuping

Subjects
Mathematics - Representation Theory, 13F60, 16G50
Abstract

We describe a ring whose category of Cohen-Macaulay modules provides an additive categorification of the cluster algebra structure on the homogeneous coordinate ring of the Grassmannian of k-planes in n-space. More precisely, there is a cluster character defined on the category which maps the rigid indecomposable objects to the cluster variables and the maximal rigid objects to clusters. This is proved by showing that the quotient of this category by a single projective-injective object is Geiss-Leclerc-Schroer's category Sub $Q_k$, which categorifies the coordinate ring of the big cell in this Grassmannian., Comment: v2: minor change in title, new Sec 9 on categorification, small changes in exposition and some new figures; v3: Sec 2 rearranged and shortened, small changes in exposition, to appear in Proc. Lond. Math. Soc

Published
2013
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20. A geometric realisation of 0-Schur and 0-Hecke algebras

Author

Jensen, Bernt Tore and Su, Xiuping

Subjects
Mathematics - Representation Theory, Mathematics - Rings and Algebras
Abstract

We define a new product on orbits of pairs of flags in a vector space, using open orbits in certain varieties of pairs of flags. This new product defines an associative $\mathbb{Z}$-algebra, denoted by $G(n,r)$. We show that $G(n,r)$ is a geometric realisation of the 0-Schur algebra $S_0(n, r)$ over $\mathbb{Z}$, which is the $q$-Schur algebra $S_q(n,r)$ at q=0. We view a pair of flags as a pair of projective resolutions for a quiver of type $\mathbb{A}$ with linear orientation, and study $q$-Schur algebras from this point of view. This allows us to understand the relation between $q$-Schur algebras and Hall algebras and construct bases of $q$-Schur algebras, which are used in the proof of the main results. Using the geometric realisation, we construct idempotents and multiplicative bases for 0-Schur algebras. We also give a geometric realisation of 0-Hecke algebras and a presentation of the $q$-Schur algebra over a base ring where $q$ is not invertible., Comment: 20 pages

Published
2012

21. Filtrations in abelian categories with a tilting object of homological dimension two

Author

Jensen, Bernt Tore, Madsen, Dag, and Su, Xiuping

Subjects
Mathematics - Representation Theory, Mathematics - K-Theory and Homology, 18E30, 16G20
Abstract

We consider filtrations of objects in an abelian category $\catA$ induced by a tilting object $T$ of homological dimension at most two. We define three disjoint subcategories with no maps between them in one direction, such that each object has a unique filtation with factors in these categories. This filtration coincides with the the classical two-step filtration induced by torsion pairs in dimension one. We also give a refined filtration, using the derived equivalence between the derived categories of $\catA$ and the module category of $End_\catA (T)^{op}$. The factors of this filtration consist of kernel and cokernels of maps between objects which are quasi-isomorphic to shifts of $End_\catA (T)^{op}$-modules via the derived equivalence $\mathbb{R}Hom_\catA(T,-)$.

Published
2010

22. Adjoint action of automorphism groups on radical endomorphisms, generic equivalence and Dynkin quivers

Author

Jensen, Bernt Tore and Su, Xiuping

Subjects
Mathematics - Representation Theory
Abstract

Let $Q$ be a connected quiver with no oriented cycles, $k$ the field of complex numbers and $P$ a projective representation of $Q$. We study the adjoint action of the automorphism group $\Aut_{kQ} P$ on the space of radical endomorphisms $\radE_{kQ}P$. Using generic equivalence, we show that the quiver $Q$ has the property that there exists a dense open $\Aut_{kQ} P$-orbit in $\radE_{kQ} P$, for all projective representations $P$, if and only if $Q$ is a Dynkin quiver. This gives a new characterisation of Dynkin quivers.

Published
2010

25. A generic multiplication in quantised Schur algebras

Author

Su, Xiuping

Subjects
Mathematics - Quantum Algebra, Mathematics - Representation Theory, 17B37, 16G20
Abstract

We define a generic multiplication in quantised Schur algebras and thus obtain a new algebra structure in the Schur algebras. We prove that via a modified version of the map from quantum groups to quantised Schur algebras, defined by A. A. Beilinson, G. Lusztig and R. MacPherson, a subalgebra of this new algebra is a quotient of the monoid algebra in Hall algebras studied by M. Reineke. We also prove that the subalgebra of the new algebra gives a geometric realisation of a positive part of 0-Schur algebras. Consequently, we obtain a multiplicative basis for the positive part of 0-Schur algebras.

Published
2008

26. Exceptional representations of a double quiver of type A, and Richardson elements in seaweed Lie algebras

Author

Jensen, Bernt Tore, Su, Xiuping, and Yu, Rupert W. T.

Subjects
Mathematics - Representation Theory, 16G20, 17B45
Abstract

In this paper, we study the set of $\Delta$-filtered modules of quasi-hereditary algebras arising from quotients of the double of quivers of type $A$. Our main result is that for any fixed $\Delta$-dimension vector, there is a unique (up to isomorphism) exceptional $\Delta$-filtered module. We then apply this result to show that there is always an open adjoint orbit in the nilpotent radical of a seaweed Lie algebra in $\mathrm{gl}_{n}(\field)$, thus answering positively in this $\mathrm{gl}_{n}(\field)$ case to a question raised independently by Michel Duflo and Dmitri Panyushev. An example of a seaweed Lie algebra in a simple Lie algebra of type $E_{8}$ not admitting an open orbit in its nilpotent radical is given.

Published
2007

27. Degeneration of A-infinity modules

Author

Jensen, Bernt Tore, Madsen, Dag, and Su, Xiuping

Subjects
Mathematics - Representation Theory, 18E30 (Primary) 14L30, 16G10 (Secondary)
Abstract

In this paper we use A-infinity modules to study the derived category of a finite dimensional algebra over an algebraically closed field. We study varieties parameterising A-infinity modules. These varieties carry an action of an algebraic group such that orbits correspond to quasi-isomorphism classes of complexes in the derived category. We describe orbit closures in these varieties, generalising a result of Zwara and Riedtmann for modules., Comment: 18 pages

Published
2007

28. Degenerations for derived categories

Author

Jensen, Bernt Tore, Su, Xiuping, and Zimmermann, Alexander

Subjects
Mathematics - Representation Theory
Abstract

We propose a theory of degenerations for derived module categories, analogous to degenerations in module varieties for module categories. In particular we define two types of degenerations, one algebraic and the other geometric. We show that these are equivalent, analogously to the Riemann-Zwara theorem for module varieties. Applications to tilting complexes are given, in particular that any two-term tilting complex is determined by its graded module structure.

Published
2004

34. Antibacterial Nanocellulose-TiO 2 /Polyester Fabric for the Recyclable Photocatalytic Degradation of Dyes.

Author

Tan, Jiacheng, Deng, Hangjun, Lu, Fangfang, Chen, Wei, Su, Xiuping, and Wang, Hairong

Subjects
PHOTODEGRADATION, NONWOVEN textiles, METHYLENE blue, DYES & dyeing, NATURAL dyes & dyeing, ESCHERICHIA coli
Abstract

In this paper, we report an antibacterial, recyclable nanocellulose–titanium dioxide/polyester nonwoven fabric (NC-TiO2/PET) composite for the highly efficient photocatalytic degradation of dyes. The NC-TiO2 was loaded onto the surface of flexible PET nonwoven fabric through a simple swelling and dipping method. The NC-TiO2 in the particle size range of ~10 nm were uniformly attached to the surface of the PET fibers. The NC-TiO2/PET composite has the ability to achieve the stable photocatalytic degradation of dyes and presents antibacterial properties. The degradation rates to methylene blue (MB) and acid red (AR) of the NC-TiO2/PET composite reached 90.02% and 91.14%, respectively, and the inhibition rate of Escherichia coli was >95%. After several rounds of cyclic testing, the photocatalytic performance, antibacterial performance, and mechanical stability of the NC-TiO2/PET composite remained robust. [ABSTRACT FROM AUTHOR]

Published
2023
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