Your search keyword '"Kashiwara, Masaki"' showing total 720 results

1. Exchange matrices of I-boxes

Author

Kashiwara, Masaki and Kim, Myungho

Subjects

Mathematics - Representation Theory, Mathematics - Quantum Algebra, 17B37, 13F60, 18D10

Abstract

Admissible chains of i-boxes are important combinatorial tools in the monoidal categorification of cluster algebras, as they provide seeds of the cluster algebra. In this paper, we explore the properties of maximal commuting families of i-boxes in a more general setting, and define a certain matrix associated with such a family, which we call the exchange matrix. It turns out that, when considering the cluster algebra structure on the Grothendieck rings, this matrix is indeed the exchange matrix of the seed associated with the family, both in certain categories of modules over quantum affine algebras and over quiver Hecke algebras. We prove this by constructing explicit short exact sequences that represent the mutation relations., Comment: 62 pages

Published

2024

2. Braid symmetries on bosonic extensions

Author

Kashiwara, Masaki, Kim, Myungho, Oh, Se-jin, and Park, Euiyong

Subjects

Mathematics - Representation Theory, Mathematics - Quantum Algebra, 05E10, 05E18, 17B37

Abstract

We introduce a family of automorphisms on the bosonic extension of arbitrary type and show that they satisfy the braid relations. They preserve the global basis and the crystal basis. Using this braid group action, we define a subalgebra for each positive braid word, which possesses the PBW type basis. As an application, we show that the tensor product decomposition of the positive bosonic extionsion, Comment: 38 pages

Published

2024

3. On the irregular Riemann-Hilbert correspondence

Author

D'Agnolo, Andrea and Kashiwara, Masaki

Subjects

Mathematics - Algebraic Geometry, Mathematics - Complex Variables, 32C38, 35A27, 32S60, 35Q1

Abstract

The original Riemann-Hilbert problem asks to find a Fuchsian ordinary differential equation with prescribed singularities and monodromy in the complex line. In the early 1980's Kashiwara solved a generalized version of the problem, valid on complex manifolds of any dimension. He presented it as a correspondence between regular holonomic D-modules and perverse sheaves. The analogous problem where one drops the regularity condition remained open for about thirty years. We solved it in the paper that received a 2024 Frontiers of Science Award. Our construction requires in particular an enhancement of the category of perverse sheaves. Here, using some examples in dimension one, we wish to convey the gist of the main ingredients used in our work. This is a written account of a talk given by the first named author at the International Congress of Basic Sciences on July 2024 in Beijing., Comment: 14 pages. minor changes

Published

2024

4. Global bases for Bosonic extensions of quantum unipotent coordinate rings

Author

Kashiwara, Masaki, Kim, Myungho, Oh, Se-jin, and Park, Euiyong

Subjects

Mathematics - Representation Theory, 05E10, 05E18, 17B37}

Abstract

In the paper, we establish the global basis theory for the bosonic extension $\widehat{\mathcal{A}}$ associated with an arbitrary generalized Cartan matrix. When $\widehat{\mathcal{A}}$ is of simply-laced finite type, it is isomorphic to the quantum Grothendieck ring of the Hernandez-Leclerc category over a quantum affine algebra. In this case, we show that the $(t,q)$-characters of simple modules in the Hernandez-Leclerc category correspond to the normalized global basis of $\widehat{\mathcal{A}}$., Comment: 37pages

Published

2024

5. Localizations for quiver Hecke algebras III

Author

Kashiwara, Masaki, Kim, Myungho, Oh, Se-jin, and Park, Euiyong

Published

2024

6. Correction: Localizations for quiver Hecke algebras III

Author

Kashiwara, Masaki, Kim, Myungho, Oh, Se-jin, and Park, Euiyong

Published

2024

7. Localizations for quiver Hecke algebras III

Author

Kashiwara, Masaki, Kim, Myungho, Oh, Se-jin, and Park, Euiyong

Subjects

Mathematics - Representation Theory, Mathematics - Quantum Algebra, 18M05, 16D90, 81R10

Abstract

Let $R$ be a quiver Hecke algebra, and let $\mathcal{C}_{w,v}$ be the category of finite-dimensional graded $R$-module categorifying a $q$-deformation of the doubly-invariant algebra $^{N'(w)} \mathbb{C}[N] ^{N(v)} $. In this paper, we prove that the localization $\tilde{\mathcal{C}}_{w,v}$ of the category $\mathcal{C}_{w,v}$ can be obtained as the localization by right braiders arising from determinantial modules. As its application, we show several interesting properties of the localized category $\tilde{\mathcal{C}}_{w,v} $ including the right rigidity., Comment: 33 pages

Published

2023

8. Laurent family of simple modules over quiver Hecke algebra

Author

Kashiwara, Masaki, Kim, Myungho, Oh, Se-jin, and Park, Euiyong

Subjects

Mathematics - Representation Theory, Mathematics - Quantum Algebra, 16D90, 13F60, 81R50, 17B37

Abstract

We introduce the notions of quasi-Laurent and Laurent families of simple modules over quiver Hecke algebras of arbitrary symmetrizable types. We prove that such a family plays a similar role of a cluster in the quantum cluster algebra theory and exhibits a quantum Laurent positivity phenomenon for the basis of the quantum unipotent coordinate ring $\mathcal{A}_q(\mathfrak{n}(w))$, coming from the categorification. Then we show that the families of simple modules categorifying GLS-clusters are Laurent families by using the PBW-decomposition vector of a simple module $X$ and categorical interpretation of (co-)degree of $[X]$. As applications of such $\mathbb{Z}$-vectors, we define several skew symmetric pairings on arbitrary pairs of simple modules, and investigate the relationships among the pairings and $\Lambda$-invariants of R-matrices in the quiver Hecke algebra theory., Comment: 26 pages

Published

2023

9. Constructibility and duality for simple holonomic modules on complex symplectic manifolds

Author

Kashiwara, Masaki and Schapira, Pierre

Published

2008

10. Affinizations, R-matrices and reflection functors

Author

Kashiwara, Masaki, Kim, Myungho, Oh, Se-jin, and Park, Euiyong

Subjects

Mathematics - Representation Theory, Mathematics - Quantum Algebra, 18M05, 16D90, 81R10

Abstract

In this paper we establish affinizations and R-matrices in the language of pro-objects, and as an application, we construct reflection functors over the localizations of quiver Hecke algebras of arbitrary finite types. This reflection functor categorifies the braid group action on the half of a quantum group and the Saito reflection., Comment: 96 pages in v1. 79 pages, small corrections with a simplified proof of Theorem 8.3 in v2. In v3, Sections 9.3 and 11 are added. In v4, we added Lemma 6.16 and Lemma 8.8, and made numerous minor changes (104 pages)

Published

2023

11. $t$-quantized Cartan matrix and R-matrices for cuspidal modules over quiver Hecke algebras

Author

Kashiwara, Masaki and Oh, Se-jin

Subjects

Mathematics - Representation Theory, Mathematics - Quantum Algebra, 17B37, 16T30, 17B67

Abstract

As every simple module of a quiver Hecke algebra appears as the image of the R-matrix defined on the convolution product of certain cuspidal modules, knowing the $\mathbb{Z}$-invariants of the R-matrices between cuspidal modules is quite significant. In this paper, we prove that the $(q,t)$-Cartan matrix specialized at $q=1$ of an arbitrary finite type, called the $t$-quantized Cartan matrix, informs us of the invariants of R-matrices. To prove this, we use combinatorial AR-quivers associated with Dynkin quivers and their properties as crucial ingredients., Comment: 71 pages

Published

2023

12. Monoidal categorification and quantum affine algebras II

Author

Kashiwara, Masaki, Kim, Myungho, Oh, Se-jin, and Park, Euiyong

Published

2024

13. Localizations for quiver Hecke algebras II

Author

Kashiwara, Masaki, Kim, Myungho, Oh, Se-jin, and Park, Euiyong

Subjects

Mathematics - Representation Theory, Mathematics - Quantum Algebra, 18D10, 16D90, 81R10

Abstract

We prove that the localization of the monoidal category $\mathcal{C}_w$ is rigid, and the category $\mathcal{C}_{w,v}$ admits a localization via a real commuting family of central objects. Note that the localization of $\mathcal{C}_{w,v}$ categorifies the open Richardson variety., Comment: 58 pages. This paper is a continuation of the former paper arXiv:1901.09319. Some parts of the preliminary sections recall materials from the former paper.

Published

2022

14. The $(q,t)$-Cartan matrix specialized at $q=1$

Author

Kashiwara, Masaki and Oh, Se-jin

Subjects

Mathematics - Quantum Algebra, Mathematics - Representation Theory, 17B37, 16T30, 17B67

Abstract

The $(q,t)$-Cartan matrix specialized at $t=1$, usually called the quantum Cartan matrix, has deep connections with (i) the representation theory of its untwisted quantum affine algebra, and (ii) quantum unipotent coordinate algebra, root system and quantum cluster algebra of kew-symmetric type. In this paper, we study the $(q,t)$-Cartan matrix specialized at $q=1$, called the $t$-quantized Cartan matrix, and investigate the relations with (ii') its corresponding quantum unipotent coordinate algebra, root system and quantum cluster algebra of skew-symmetrizable type., Comment: 55p ages. 2v 46 pages, references updated, typos corrected. 3v 51 pages, small changes

Published

2022

15. Categorical crystals for quantum affine algebras

Author

Kashiwara, Masaki and Park, Euiyong

Subjects

Mathematics - Quantum Algebra, Mathematics - Representation Theory, 17B37, 05E10, 18D10

Abstract

A new categorical crystal structure for the quantum affine algebras is presented. We introduce the extended crystal $\widehat{B}_{\mathfrak{g}}(\infty)$ for an arbitrary quantum group, which is the product of infinite copies of the crystal $B(\infty)$. For a complete duality datum in the Hernandez-Leclerc category $\mathcal{C}^0_{\mathfrak{g}}$ of a quantum affine algebra $U_q'(\mathfrak{g})$, we prove that the set of the isomorphism classes of simple modules in $\mathcal{C}^0_{\mathfrak{g}}$ has an extended crystal structure isomorphic to the extended crystal $\widehat{B}_{\mathfrak{g}}(\infty)$. An explicit combinatorial description of the extended crystal $\widehat{B}_{\mathfrak{g}}(\infty)$ for affine type $A_n^{(1)}$ is given in terms of affine highest weights., Comment: 61 pages

Published

2021

16. Monoidal categorification and quantum affine algebras II

Author

Kashiwara, Masaki, Kim, Myungho, Oh, Se-jin, and Park, Euiyong

Subjects

Mathematics - Quantum Algebra, Mathematics - Representation Theory, 17B37, 13F60, 18D10

Abstract

We introduce a new family of real simple modules over the quantum affine algebras, called the affine determinantial modules, which contains the Kirillov-Reshetikhin (KR)-modules as a special subfamily, and then prove T-systems among them which generalize the T-systems among KR-modules and unipotent quantum minors in the quantum unipotent coordinate algebras simultaneously. We develop new combinatorial tools: admissible chains of i-boxes which produce commuting families of affine determinantial modules, and box moves which describe the T-system in a combinatorial way. Using these results, we prove that various module categories over the quantum affine algebras provide monoidal categorifications of cluster algebras. As special cases, Hernandez-Leclerc categories provide monoidal categorifications of the cluster algebras for an arbitrary quantum affine algebra., Comment: This paper is the complete version of the announcement arXiv:2005.10969v1. 77 pages. v3 replaces the wrong version 2, 95 pages

Published

2021

17. Affinizations, R-matrices and reflection functors

Author

Kashiwara, Masaki, Kim, Myungho, Oh, Se-jin, and Park, Euiyong

Published

2024

18. t-quantized Cartan matrix and R-matrices for cuspidal modules over quiver Hecke algebras

Author

Kashiwara, Masaki and Oh, Se-jin

Published

2024

19. PBW theory for quantum affine algebras

Author

Kashiwara, Masaki, Kim, Myungho, Oh, Se-jin, and Park, Euiyong

Subjects

Mathematics - Representation Theory, Mathematics - Quantum Algebra, 17B37, 81R50, 18D10

Abstract

Let $U_q'(\mathfrak{g})$ be a quantum affine algebra of arbitrary type and let $\mathcal{C}_{\mathfrak{g}}$ be Hernandez-Leclerc's category. We can associate the quantum affine Schur-Weyl duality functor $F_D$ to a duality datum $D$ in $\mathcal{C}_{\mathfrak{g}}$. We introduce the notion of a strong (complete) duality datum $D$ and prove that, when $D$ is strong, the induced duality functor $F_D$ sends simple modules to simple modules and preserves the invariants $\Lambda$ and $\Lambda^\infty$ introduced by the authors. We next define the reflections $\mathcal{S}_k$ and $\mathcal{S}^{-1}_k$ acting on strong duality data $D$. We prove that if $D$ is a strong (resp.\ complete) duality datum, then $\mathcal{S}_k(D)$ and $\mathcal{S}_k^{-1}(D)$ are also strong (resp.\ complete ) duality data. We finally introduce the notion of affine cuspidal modules in $\mathcal{C}_{\mathfrak{g}}$ by using the duality functor $F_D$, and develop the cuspidal module theory for quantum affine algebras similarly to the quiver Hecke algebra case., Comment: 63 pages. This is a full paper of the announcement: PBW theoretic approach to the module category of quantum affine algebras, arXiv:2005.04838v2. v2: minor changes

Published

2020

20. Categories over quantum affine algebras and monoidal categorification

Author

Kashiwara, Masaki, Kim, Myungho, Oh, Se-jin, and Park, Euiyong

Subjects

Mathematics - Quantum Algebra, Mathematics - Representation Theory, 17B37, 81R50, 18D10

Abstract

Let $U_q'(\mathfrak{g})$ be a quantum affine algebra of untwisted affine $ADE$ type, and $\mathcal{C}_{\mathfrak{g}}^0$ the Hernandez-Leclerc category of finite-dimensional $U_q'(\mathfrak{g})$-modules. For a suitable infinite sequence $\widehat{w}_0= \cdots s_{i_{-1}}s_{i_0}s_{i_1} \cdots$ of simple reflections, we introduce subcategories $\mathcal{C}_{\mathfrak{g}}^{[a,b]}$ of $\mathcal{C}_{\mathfrak{g}}^0$ for all $a \le b \in \mathbb{Z}\sqcup\{ \pm \infty \}$. Associated with a certain chain $\mathfrak{C}$ of intervals in $[a,b]$, we construct a real simple commuting family $M(\mathfrak{C})$ in $\mathcal{C}_{\mathfrak{g}}^{[a,b]}$, which consists of Kirillov-Reshetikhin modules. The category $\mathcal{C}_{\mathfrak{g}}^{[a,b]}$ provides a monoidal categorification of the cluster algebra $K(\mathcal{C}_{\mathfrak{g}}^{[a,b]})$, whose set of initial cluster variables is $[M(\mathfrak{C})]$. In particular, this result gives an affirmative answer to the monoidal categorification conjecture on $\mathcal{C}_{\mathfrak{g}}^-$ by Hernandez-Leclerc since it is $\mathcal{C}_{\mathfrak{g}}^{[-\infty,0]}$, and is also applicable to $\mathcal{C}_{\mathfrak{g}}^0$ since it is $\mathcal{C}_{\mathfrak{g}}^{[-\infty,\infty]}$., Comment: 10 pages. This paper is an announcement whose details will appear elsewhere

Published

2020

21. PBW theoretic approach to the module category of quantum affine algebras

Author

Kashiwara, Masaki, Kim, Myungho, Oh, Se-jin, and Park, Euiyong

Subjects

Mathematics - Representation Theory, Mathematics - Quantum Algebra, 17B37, 81R50, 18D10

Abstract

Let $U_q'(\mathfrak{g})$ be a quantum affine algebra of untwisted affine ADE type and let $\mathcal{C}^0_{\mathfrak{g}}$ be Hernandez-Leclerc's category. For a duality datum $\mathcal{D}$ in $\mathcal{C}^0_{\mathfrak{g}}$, we denote by $\mathcal{F}_{\mathcal{D}}$ the quantum affine Weyl-Schur duality functor. We give sufficient conditions for a duality datum $\mathcal{D}$ to provide the functor $\mathcal{F}_{\mathcal{D}}$ sending simple modules to simple modules. Then we introduce the notion of cuspidal modules in $\mathcal{C}^0_{\mathfrak{g}}$, and show that all simple modules in $\mathcal{C}^0_{\mathfrak{g}}$ can be constructed as the heads of ordered tensor products of cuspidal modules., Comment: 9 pages. This is an announcement paper whose details will appear elsewhere

Published

2020

22. Braid group action on the module category of quantum affine algebras

Author

Kashiwara, Masaki, Kim, Myungho, Oh, Se-jin, and Park, Euiyong

Subjects

Mathematics - Representation Theory, Mathematics - Quantum Algebra, 17B37, 20F36, 18D10

Abstract

Let $\mathfrak{g}_0$ be a simple Lie algebra of type ADE and let $U'_q(\mathfrak{g})$ be the corresponding untwisted quantum affine algebra. We show that there exists an action of the braid group $B(\mathfrak{g}_0)$ on the quantum Grothendieck ring $K_t(\mathfrak{g})$ of Hernandez-Leclerc's category $C_{\mathfrak{g}}^0$. Focused on the case of type $A_{N-1}$, we construct a family of monoidal autofunctors $\{\mathscr{S}_i\}_{i\in \mathbb{Z}}$ on a localization $T_N$ of the category of finite-dimensional graded modules over the quiver Hecke algebra of type $A_{\infty}$. Under an isomorphism between the Grothendieck ring $K(T_N)$ of $T_N$ and the quantum Grothendieck ring $K_t({A^{(1)}_{N-1}})$, the functors $\{\mathscr{S}_i\}_{1\le i\le N-1}$ recover the action of the braid group $B(A_{N-1})$. We investigate further properties of these functors., Comment: 10 pages. This is an announcement paper whose details will appear elsewhere

Published

2020

23. Simply-laced root systems arising from quantum affine algebras

Author

Kashiwara, Masaki, Kim, Myungho, Oh, Se-jin, and Park, Euiyong

Subjects

Mathematics - Representation Theory, Mathematics - Quantum Algebra

Abstract

Let $U_q'(\mathfrak{g})$ be a quantum affine algebra with an indeterminate $q$ and let $\mathscr{C}_{\mathfrak{g}}$ be the category of finite-dimensional integrable $U_q'(\mathfrak{g})$-modules. We write $\mathscr{C}_{\mathfrak{g}}^0$ for the monoidal subcategory of $\mathscr{C}_{\mathfrak{g}}$ introduced by Hernandez-Leclerc. In this paper, we associate a simply-laced finite type root system to each quantum affine algebra $U_q'(\mathfrak{g})$ in a natural way, and show that the block decompositions of $\mathscr{C}_{\mathfrak{g}}$ and $\mathscr{C}_{\mathfrak{g}}^0$ are parameterized by the lattices associated with the root system. We first define a certain abelian group $\mathcal{W}$ (resp. $\mathcal{W}_0$) arising from simple modules of $ \mathscr{C}_{\mathfrak{g}}$ (resp. $\mathscr{C}_{\mathfrak{g}}^0$) by using the invariant $\Lambda^\infty$ introduced in the previous work by the authors. The groups $\mathcal{W}$ and $\mathcal{W}_0$ have the subsets $\Delta$ and $\Delta_0$ determined by the fundamental representations in $ \mathscr{C}_{\mathfrak{g}}$ and $\mathscr{C}_{\mathfrak{g}}^0$ respectively. We prove that the pair $( \mathbb{R} \otimes_\mathbb{Z} \mathcal{W}_0, \Delta_0)$ is an irreducible simply-laced root system of finite type and the pair $( \mathbb{R} \otimes_\mathbb{Z} \mathcal{W}, \Delta) $ is isomorphic to the direct sum of infinite copies of $( \mathbb{R} \otimes_\mathbb{Z} \mathcal{W}_0, \Delta_0)$ as a root system., Comment: 57 pages; minor revision; to appear in Compositio Mathematica

Published

2020

24. Enhanced nearby and vanishing cycles in dimension one and Fourier transform

Author

D'Agnolo, Andrea and Kashiwara, Masaki

Subjects

Mathematics - Algebraic Geometry

Abstract

Enhanced ind-sheaves provide a suitable framework for the irregular Riemann-Hilbert correspondence. In this paper, we give some precisions on nearby and vanishing cycles for enhanced perverse objects in dimension one. As an application, we give a topological proof of the following fact. Let $\mathcal M$ be a holonomic algebraic $\mathcal D$-module on the affine line, and denote by ${}^{\mathsf{L}}\mathcal M$ its Fourier-Laplace transform. For a point $a$ on the affine line, denote by $\ell_a$ the corresponding linear function on the dual affine line. Then, the vanishing cycles of $\mathcal M$ at $a$ are isomorphic to the graded component of degree $\ell_a$ of the Stokes filtration of ${}^{\mathsf{L}}\mathcal M$ at infinity., Comment: 25 pages; final version before publication

Published

2020

25. On a topological counterpart of regularization for holonomic D-modules

Author

D'Agnolo, Andrea and Kashiwara, Masaki

Subjects

Mathematics - Algebraic Geometry, 32C38, 14F05

Abstract

On a complex manifold, the embedding of the category of regular holonomic D-modules into that of holonomic D-modules has a left quasi-inverse functor $\mathcal{M}\mapsto\mathcal{M}_{\mathrm{reg}}$, called regularization. Recall that $\mathcal{M}_{\mathrm{reg}}$ is reconstructed from the de Rham complex of $\mathcal{M}$ by the regular Riemann-Hilbert correspondence. Similarly, on a topological space, the embedding of sheaves into enhanced ind-sheaves has a left quasi-inverse functor, called here sheafification. Regularization and sheafification are intertwined by the irregular Riemann-Hilbert correspondence. Here, we study some of their properties. In particular, we provide a germ formula for the sheafification of enhanced specialization and microlocalization., Comment: 31 pages

Published

2020

26. A finiteness theorem for holonomic DQ-modules on Poisson manifolds

Author

Kashiwara, Masaki and Schapira, Pierre

Subjects

Mathematics - Algebraic Geometry, 53D55, 35A27, 19L10, 32C38

Abstract

On a complex symplectic manifold we prove a finiteness result for the global sections of solutions of holonomic DQ-modules in two cases: (a) by assuming that there exists a Poisson compactification (b) in the algebraic case. This extends our previous results in which the symplectic manifold was compact. The main tool is a finiteness theorem for R-constructible sheaves on a real analytic manifold in a non proper situation., Comment: In v2, some mistakes corrected and many new results added

Published

2020

27. Monoidal categorification and quantum affine algebras

Author

Kashiwara, Masaki, Kim, Myungho, Oh, Se-jin, and Park, Euiyong

Subjects

Mathematics - Representation Theory, Mathematics - Quantum Algebra, 17B37, 13F60, 18D10

Abstract

We introduce and investigate new invariants on the pair of modules $M$ and $N$ over quantum affine algebras $U_q'(\mathfrak{g})$ by analyzing their associated R-matrices. From new invariants, we provide a criterion for a monoidal category of finite-dimensional integrable $U_q'(\mathfrak{g})$-modules to become a monoidal categorification of a cluster algebra., Comment: 42 pages

Published

2019

28. Enhanced specialization and microlocalization

Author

D'Agnolo, Andrea and Kashiwara, Masaki

Subjects

Mathematics - Algebraic Geometry, 32C38, 35A27, 14F05

Abstract

Enhanced ind-sheaves provide a suitable framework for the irregular Riemann-Hilbert correspondence. In this paper, we show how Sato's specialization and microlocalization functors have a natural enhancement, and discuss some of their properties., Comment: 29 pages

Published

2019

29. Cluster algebra structures on module categories over quantum affine algebras

Author

Kashiwara, Masaki, Kim, Myungho, Oh, Se-jin, and Park, Euiyong

Subjects

Mathematics - Quantum Algebra, Mathematics - Representation Theory, 81R50, 16F60, 16G, 16T, 17B37

Abstract

We study monoidal categorifications of certain monoidal subcategories $\mathcal{C}_J$ of finite-dimensional modules over quantum affine algebras, whose cluster algebra structures coincide and arise from the category of finite-dimensional modules over quiver Hecke algebra of type A${}_\infty$. In particular, when the quantum affine algebra is of type A or B, the subcategory coincides with the monoidal category $\mathcal{C}_{\mathfrak{g}}^0$ introduced by Hernandez-Leclerc. As a consequence, the modules corresponding to cluster monomials are real simple modules over quantum affine algebras., Comment: 66 pages

Published

2019

30. Localizations for quiver Hecke algebras

Author

Kashiwara, Masaki, Kim, Myungho, Oh, Se-jin, and Park, Euiyong

Subjects

Mathematics - Representation Theory, Mathematics - Quantum Algebra, 18D10, 16D90, 81R10

Abstract

We provide the localization procedure for monoidal categories by a real commuting family of braiders. For an element $w$ of the Weyl group, $\mathscr{C}_w$ is a subcategory of modules over quiver Hecke algebra which categorifies the quantum unipotent coordinate algebra $A_q[\mathfrak{n}(w)]$. We construct the localization $\widetilde{\mathscr{C}_w}$ of $\mathscr{C}_w$ by adding the inverses of simple modules which correspond to the frozen variables in the quantum cluster algebra $A_q[\mathfrak{n}(w)]$. The localization $\widetilde{\mathscr{C}_w}$ is left rigid and we expect that it is rigid., Comment: v1, 74 pages. v2, 75 pages, small corrections

Published

2019

31. Laurent phenomenon and simple modules of quiver Hecke algebras

Author

Kashiwara, Masaki and Kim, Myungho

Subjects

Mathematics - Representation Theory, Mathematics - Quantum Algebra, 13F60, 81R50, 16G, 17B37

Abstract

We study consequences of a monoidal categorification of the unipotent quantum coordinate ring $A_q(\mathfrak{n}(w))$ together with the Laurent phenomenon of cluster algebras. We show that if a simple module $S$ in the category $\mathcal C_w$ strongly commutes with all the cluster variables in a cluster $[ \mathscr C]$, then $[S]$ is a cluster monomial in $[ \mathscr C ]$. If $S$ strongly commutes with cluster variables except exactly one cluster variable $[M_k]$, then $[S]$ is either a cluster monomial in $[\mathscr C ]$ or a cluster monomial in $\mu_k([ \mathscr C ])$. We give a new proof of the fact that the upper global basis is a common triangular basis (in the sense of Fan Qin) of the localization $\widetilde A_q(\mathfrak{n}(w))$ of $A_q(\mathfrak{n}(w))$ at the frozen variables. A characterization on the commutativity of a simple module $S$ with cluster variables in a cluster $[ \mathscr C]$ is given in terms of the denominator vector of $[S]$ with respect to the cluster $[ \mathscr C]$., Comment: 38 pages, v.2: small change, one reference added

Published

2018

32. Crystal bases and categorifications

Author

Kashiwara, Masaki

Subjects

Mathematics - Representation Theory, Mathematics - Quantum Algebra, 13F60, 81R50, 16G, 17B37

Abstract

This is a survey paper of the theory of crystal bases, global bases and the cluster algebra structure on the quantum coordinate rings., Comment: This is submitted to Poceedings of ICM18

Published

2018

33. Piecewise linear sheaves

Author

Kashiwara, Masaki and Schapira, Pierre

Subjects

Mathematics - Algebraic Geometry, 55N99, 18A99, 35A27

Abstract

On a finite-dimensional real vector space, we give a microlocal characterization of (derived) piecewise linear sheaves (PL sheaves) and prove that the triangulated category of such sheaves is generated by sheaves associated with convex polyhedra. We then give a similar theorem for PL gamma-sheaves, that is, PL sheaves associated with the gamma-topology, for a closed convex polyhedral proper cone gamma. Our motivation is that convex polyhedra may be considered as building blocks for higher dimensional barcodes., Comment: A few corrections, including bibliographical, with respect to the previous version. This paper is a continuation of arXiv:1705.00955. to appear at IMRN

Published

2018

34. Monoidal categorification of cluster algebras (merged version)

Author

Kang, Seok-Jin, Kashiwara, Masaki, Kim, Myungho, and Oh, Se-jin

Subjects

Mathematics - Representation Theory, 13F60, 81R50, 16G, 17B37

Abstract

We prove that the quantum cluster algebra structure of a unipotent quantum coordinate ring $A_q(\mathfrak{n}(w))$, associated with a symmetric Kac-Moody algebra and its Weyl group element $w$, admits a monoidal categorification via the representations of symmetric Khovanov-Lauda- Rouquier algebras. In order to achieve this goal, we give a formulation of monoidal categorifications of quantum cluster algebras and provide a criterion for a monoidal category of finite-dimensional graded $R$-modules to become a monoidal categorification, where $R$ is a symmetric Khovanov-Lauda-Rouquier algebra. Roughly speaking, this criterion asserts that a quantum monoidal seed can be mutated successively in all the directions, once the first-step mutations are possible. Then, we show the existence of a quantum monoidal seed of $A_q(\mathfrak{n}(w))$ which admits the first-step mutations in all the directions. As a consequence, we prove the conjecture that any cluster monomial is a member of the upper global basis up to a power of $q^{1/2}$. In the course of our investigation, we also give a proof of a conjecture of Leclerc on the product of upper global basis elements., Comment: 91pages. This is a merged version of Monoidal categorification of cluster algebras (arXiv:1412.8106) and ibid, II (arXiv:1502.06714). Although the contents are the same, connsiderable modifications have been made. This version is published in Journal of the American Mathematical Society

Published

2018

35. Monoidal categories of modules over quantum affine algebras of type A and B

Author

Kashiwara, Masaki, Kim, Myungho, and Oh, Se-jin

Subjects

Mathematics - Representation Theory, Mathematics - Quantum Algebra, 81R50, 16G, 16T25, 17B37

Abstract

We construct an exact tensor functor from the category $\mathcal{A}$ of finite-dimensional graded modules over the quiver Hecke algebra of type $A_\infty$ to the category $\mathscr C_{B^{(1)}_n}$ of finite-dimensional integrable modules over the quantum affine algebra of type $B^{(1)}_n$. It factors through the category $\mathcal T_{2n}$, which is a localization of $\mathcal{A}$. As a result, this functor induces a ring isomorphism from the Grothendieck ring of $\mathcal T_{2n}$ (ignoring the gradings) to the Grothendieck ring of a subcategory $\mathscr C^{0}_{B^{(1)}_n}$ of $\mathscr C_{B^{(1)}_n}$. Moreover, it induces a bijection between the classes of simple objects. Because the category $\mathcal T_{2n}$ is related to categories $\mathscr C^{0}_{A^{(t)}_{2n-1}}$ $(t=1,2)$ of the quantum affine algebras of type $A^{(t)}_{2n-1}$, we obtain an interesting connection between those categories of modules over quantum affine algebras of type $A$ and type $B$. Namely, for each $t =1,2$, there exists an isomorphism between the Grothendieck ring of $\mathscr C^{0}_{A^{(t)}_{2n-1}}$ and the Grothendieck ring of $\mathscr C^{0}_{B^{(1)}_n}$, which induces a bijection between the classes of simple modules., Comment: 39pages

Published

2017

36. A microlocal approach to the enhanced Fourier-Sato transform in dimension one

Author

D'Agnolo, Andrea and Kashiwara, Masaki

Subjects

Mathematics - Classical Analysis and ODEs, Mathematics - Algebraic Geometry, 34M35, 32S40, 32C38, 30E15

Abstract

Let $\mathcal{M}$ be a holonomic algebraic $\mathcal{D}$-module on the affine line. Its exponential factors are Puiseux germs describing the growth of holomorphic solutions to $\mathcal{M}$ at irregular points. The stationary phase formula states that the exponential factors of the Fourier transform of $\mathcal{M}$ are obtained by Legendre transform from the exponential factors of $\mathcal{M}$. We give a microlocal proof of this fact, by translating it in terms of enhanced ind-sheaves through the Riemann-Hilbert correspondence., Comment: 56 pages

Published

2017

37. Monoidal categories associated with strata of flag manifolds

Author

Kashiwara, Masaki, Kim, Myungho, Oh, Se-jin, and Park, Euiyong

Subjects

Mathematics - Representation Theory

Abstract

We construct a monoidal category $\mathscr{C}_{w,v}$ which categorifies the doubly-invariant algebra $^{N'(w)}\mathbb{C}[N]^{N(v)}$ associated with Weyl group elements $w$ and $v$. It gives, after a localization, the coordinate algebra $\mathbb{C}[\mathcal{R}_{w,v}]$ of the open Richardson variety associated with $w$ and $v$. The category $\mathscr{C}_{w,v}$ is realized as a subcategory of the graded module category of a quiver Hecke algebra $R$. When $v= \mathrm{id}$, $\mathscr{C}_{w,v}$ is the same as the monoidal category which provides a monoidal categorification of the quantum unipotent coordinate algebra $A_q(\mathfrak{n}(w))_{\mathbb{Z}[q,q^{-1}]}$ given by Kang-Kashiwara-Kim-Oh. We show that the category $\mathscr{C}_{w,v}$ contains special determinantial modules $\mathsf{M}(w_{\le k}\Lambda, v_{\le k}\Lambda)$ for $k=1, \ldots, \ell(w)$, which commute with each other. When the quiver Hecke algebra $R$ is symmetric, we find a formula of the degree of $R$-matrices between the determinantial modules $\mathsf{M}(w_{\le k}\Lambda, v_{\le k}\Lambda)$. When it is of finite $ADE$ type, we further prove that there is an equivalence of categories between $\mathscr{C}_{w,v}$ and $\mathscr{C}_u$ for $w,u,v \in \mathsf{W}$ with $w = vu$ and $\ell(w) = \ell(v) + \ell(u)$., Comment: 50 pages, minor revision, to appear in Advances in Mathematics

Published

2017

38. Categorical relations between Langlands dual quantum affine algebras: Doubly laced types

Author

Kashiwara, Masaki and Oh, Se-jin

Subjects

Mathematics - Representation Theory, Mathematics - Combinatorics, Mathematics - Quantum Algebra

Abstract

We prove that the Grothendieck rings of category $\mathcal{C}^{(t)}_Q$ over quantum affine algebras $U_q'(\g^{(t)})$ $(t=1,2)$ associated to each Dynkin quiver $Q$ of finite type $A_{2n-1}$ (resp. $D_{n+1}$) is isomorphic to one of category $\mathcal{C}_{\mQ}$ over the Langlands dual $U_q'({^L}\g^{(2)})$ of $U_q'(\g^{(2)})$ associated to any twisted adapted class $[\mQ]$ of $A_{2n-1}$ (resp. $D_{n+1}$). This results provide partial answers of conjectures of Frenkel-Hernandez on Langlands duality for finite-dimensional representation of quantum affine algebras.

Published

2017

39. Persistent homology and microlocal sheaf theory

Author

Kashiwara, Masaki and Schapira, Pierre

Subjects

Mathematics - Algebraic Topology, 55N99, 18A99, 35A27

Abstract

We interpret some results of persistent homology and barcodes (in any dimension) with the language of microlocal sheaf theory. For that purpose we study the derived category of sheaves on a real finite-dimensional vector space V. By using the operation of convolution, we introduce a pseudo-distance on this category and prove in particular a stability result for direct images. Then we assume that V is endowed with a closed convex proper cone $\gamma$ with non empty interior and study $\gamma$-sheaves, that is, constructible sheaves with microsupport contained in the antipodal to the polar cone (equivalently, constructible sheaves for the $\gamma$-topology). We prove that such sheaves may be approximated (for the pseudo-distance) by "piecewise linear" $\gamma$-sheaves. Finally we show that these last sheaves are constant on stratifications by $\gamma$-locally closed sets, an analogue of barcodes in higher dimension., Comment: A few corrections in Section 1.4. Accepted in Journal of Applied and Computational Topology

Published

2017

40. Riemann-Hilbert correspondence for irregular holonomic D-modules

Author

Kashiwara, Masaki

Subjects

Mathematics - Algebraic Geometry, Mathematics - Complex Variables

Abstract

This is a survey paper on the Riemann-Hilbert correspondence on (irregular) holonomic D-modules, based on the 16-th Takagi lecture (2015/11/28). In this paper, we use subanalytic sheaves, an analogous notion to the one of indsheaves., Comment: 36 pages. arXiv admin note: text overlap with arXiv:1507.00118

Published

2015

41. Enhanced perversities

Author

D'Agnolo, Andrea and Kashiwara, Masaki

Subjects

Mathematics - Algebraic Geometry, Mathematics - Category Theory, 18D, 32C38, 18E30

Abstract

The Riemann-Hilbert correspondence embeds the triangulated category of (not necessarily regular) holonomic D-modules into that of $\mathbb R$-constructible enhanced ind-sheaves. The source category has a standard t-structure. Here, we provide the target category with a middle perversity t-structure, and prove that the embedding is exact., Comment: 65 pages

Published

2015

42. Self-dual T-structure

Author

Kashiwara, Masaki

Subjects

Mathematics - Category Theory, Mathematics - Algebraic Geometry, Mathematics - Representation Theory, 18D, 18E30

Abstract

We give a self-dual t-structure on the derived category of $\mathbb{R}$-constructible sheaves over a Noetherian regular ring by generalizing the notion of t-structure., Comment: 23 pages. small corrections in the 2-nd version

Published

2015

43. Regular and irregular holonomic D-modules

Author

Kashiwara, Masaki and Schapira, Pierre

Subjects

Mathematics - Algebraic Geometry, Mathematics - Complex Variables, 32C38, 35A27, 35Q15

Abstract

This is a survey paper based on a series of lectures given at the IHES in February/March 2015. In a first part, we recall the main results on the tempered holomorphic solutions of D-modules in the language of indsheaves and, as an application, the Riemann-Hilbert correspondence for regular holonomic modules. In a second part, we present the enhanced version of the first part, treating along the same lines the irregular holonomic case., Comment: 114 pages

Published

2015

44. Affinizations and R-matrices for quiver Hecke algebras

Author

Kashiwara, Masaki and Park, Euiyong

Subjects

Mathematics - Representation Theory, Mathematics - Quantum Algebra, 16G99, 17B37, 81R50

Abstract

We introduce the notion of affinizations and R-matrices for arbitrary quiver Hekcke algebras. We show that they enjoy similar properties to those for symmetric quiver Hecke algebras. We next define the notion of a duality datum and construct a tensor functor between graded module categories of two quiver Hecke algebras. We give several examples of such functors ., Comment: 37 pages; minor typos corrected; to appear in Journal of the European Mathematical Society

Published

2015

45. Symmetric quiver Hecke algebras and R-matrices of Quantum affine algebras IV

Author

Kang, Seok-Jin, Kashiwara, Masaki, Kim, Myungho, and Oh, Se-jin

Subjects

Mathematics - Representation Theory, Mathematics - Quantum Algebra, 81R50, 16G, 16T25, 17B37

Abstract

Let $U'_q(\mathfrak{g})$ be a twisted affine quantum group of type $A_{N}^{(2)}$ or $D_{N}^{(2)}$ and let $\mathfrak{g}_{0}$ be the finite-dimensional simple Lie algebra of type $A_{N}$ or $D_{N}$. For a Dynkin quiver of type $\mathfrak{g}_{0}$, we define a full subcategory ${\mathcal C}_{Q}^{(2)}$ of the category of finite-dimensional integrable $U'_q(\mathfrak{g})$-modules, a twisted version of the category ${\mathcal C}_{Q}$ introduced by Hernandez and Leclerc. Applying the general scheme of affine Schur-Weyl duality, we construct an exact faithful KLR-type duality functor ${\mathcal F}_{Q}^{(2)}: Rep(R) \rightarrow {\mathcal C}_{Q}^{(2)}$, where $Rep(R)$ is the category of finite-dimensional modules over the quiver Hecke algebra $R$ of type $\mathfrak{g}_{0}$ with nilpotent actions of the generators $x_k$. We show that ${\mathcal F}_{Q}^{(2)}$ sends any simple object to a simple object and induces a ring isomorphism $K(Rep(R)) \simeq K({\mathcal C}_{Q}^{(2)})$., Comment: 30pages

Published

2015

46. Monoidal categorification of cluster algebras II

Author

Kang, Seok-Jin, Kashiwara, Masaki, Kim, Myungho, and Oh, Se-jin

Subjects

Mathematics - Representation Theory, Mathematics - Quantum Algebra, 13F60, 81R50, 17B37

Abstract

We prove that the quantum unipotent coordinate algebra $A_q(\mathfrak{n}(w))\ $ associated with a symmetric Kac-Moody algebra and its Weyl group element $w$ has a monoidal categorification as a quantum cluster algebra. As an application of our earlier work, we achieve it by showing the existence of a quantum monoidal seed of $A_q(\mathfrak{n}(w))$ which admits the first-step mutations in all the directions. As a consequence, we solve the conjecture that any cluster monomial is a member of the upper global basis up to a power of $q^{1/2}$., Comment: 51pages

Published

2015

47. Memories of Mikio Sato (1928–2023)

Author

Schapira, Pierre, primary, Kawai, Takahiro, additional, Takei, Yoshitsugu, additional, Kashiwara, Masaki, additional, McCoy, Barry M., additional, Tracy, Craig, additional, Miwa, Tetsuji, additional, and Jimbo, Michio, additional

Published

2024

48. Monoidal categorification of cluster algebras

Author

Kang, Seok-Jin, Kashiwara, Masaki, Kim, Myungho, and Oh, Se-jin

Subjects

Mathematics - Representation Theory, Mathematics - Quantum Algebra, 13F60, 81R50, 16G, 17B37

Abstract

We give a definition of monoidal categorifications of quantum cluster algebras and provide a criterion for a monoidal category of finite-dimensional graded $R$-modules to become a monoidal categorification of a quantum cluster algebra, where $R$ is a symmetric Khovanov-Lauda-Rouquier algebra. Roughly speaking, this criterion asserts that a quantum monoidal seed can be mutated successively in all the directions once the first-step mutations are possible. In the course of the study, we also give a proof of a conjecture of Leclerc on the product of upper global basis elements., Comment: 44 pages

Published

2014

49. Symmetric quiver Hecke algebras and R-matrices of quantum affine algebras III

Author

Kang, Seok-Jin, Kashiwara, Masaki, Kim, Myungho, and Oh, Se-jin

Subjects

Mathematics - Representation Theory, 81R50, 16G, 16T25, 17B37

Abstract

Let $\CC^0_{\g}$ be the category of finite-dimensional integrable modules over the quantum affine algebra $U_{q}'(\g)$ and let $R^{A_\infty}\gmod$ denote the category of finite-dimensional graded modules over the quiver Hecke algebra of type $A_{\infty}$. In this paper, we investigate the relationship between the categories $\CC^0_{A_{N-1}^{(1)}}$ and $\CC^0_{A_{N-1}^{(2)}}$ by constructing the generalized quantum affine Schur-Weyl duality functors $\F^{(t)}$ from $R^{A_\infty}\gmod$ to $\CC^0_{A_{N-1}^{(t)}}$ $(t=1,2)$., Comment: This version is the last version and accepted for publication in the Proceedings of the London Mathematical Society

Published

2014

50. Dual Perfect Bases and dual perfect graphs

Author

Kahng, Byeong Hoon, Kang, Seok-Jin, Kashiwara, Masaki, and Suh, Uhi Rinn

Subjects

Mathematics - Representation Theory

Abstract

We introduce the notion of dual perfect bases and dual perfect graphs. We show that every integrable highest weight module $V_q(\lambda)$ over a quantum generalized Kac-Moody algebra $U_{q}(\mathcal{g})$ has a dual perfect basis and its dual perfect graph is isomorphic to the crystal $B(\lambda)$. We also show that the negative half $U_{q}^{-}(\mathcal{g})$ has a dual perfect basis whose dual perfect graph is isomorphic to the crystal $B(\infty)$. More generally, we prove that all the dual perfect graphs of a given dual perfect space are isomorphic as abstract crystals. Finally, we show that the isomorphism classes of finitely generated graded projective indecomposable modules over a Khovanov-Lauda-Rouquier algebra and its cyclotomic quotients form dual perfect bases for their Grothendieck groups.

Published

2014