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ЖУРНАЛЫ // Symmetry, Integrability and Geometry: Methods and Applications
SIGMA, 2009, том 5, 003, 37 стр. (Mi sigma349)
Quiver Varieties and Branching
Hiraku Nakajima

Эта публикация цитируется в следующих статьяx:
  1. Ryo Fujita, “Affine highest weight categories and quantum affine Schur-Weyl duality of Dynkin quiver types”, Represent. Theory, 26:8 (2022), 211  crossref
  2. Alastair Craw, Søren Gammelgaard, Ádám Gyenge, Balázs Szendrői, “Quot Schemes for Kleinian Orbifolds”, SIGMA, 17 (2021), 099, 21 pp.  mathnet  crossref
  3. Craw A., Gammelgaard S., Gyenge A., Szendroi B., “Punctual Hilbert Schemes For Kleinian Singularities as Quiver Varieties”, Algebraic Geom., 8:6 (2021), 680–704  crossref  mathscinet  isi
  4. Hiraku Nakajima, “Euler numbers of Hilbert schemes of points on simple surface singularities and quantum dimensions of standard modules of quantum affine algebras”, Kyoto J. Math., 61:2 (2021)  crossref
  5. Schiffmann O., Vasserot E., “On Cohomological Hall Algebras of Quivers: Generators”, J. Reine Angew. Math., 760 (2020), 59–132  crossref  mathscinet  isi  scopus
  6. Bellamy G., Craw A., “Birational Geometry of Symplectic Quotient Singularities”, Invent. Math., 222:2 (2020), 399–468  crossref  mathscinet  isi  scopus
  7. Halpern-Leistner D., Sam V S., “Combinatorial Constructions of Derived Equivalences”, J. Am. Math. Soc., 33:3 (2020), 735–773  crossref  mathscinet  isi  scopus
  8. Kimura Y., “Introduction to Quiver Varieties”, Two Algebraic Byways From Differential Equations: Grobner Bases and Quivers, Algorithms and Computation in Mathematics, 28, eds. Iohara K., Malbos P., Saito M., Takayama N., Springer International Publishing Ag, 2020, 231–270  crossref  mathscinet  isi
  9. Arbarello E., Sacca G., “Singularities of Moduli Spaces of Sheaves on K3 Surfaces and Nakajima Quiver Varieties”, Adv. Math., 329 (2018), 649–703  crossref  mathscinet  zmath  isi  scopus
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  11. Braden T., Licata A., Proudfoot N., Webster B., “Quantizations of conical symplectic resolutions II: category $\mathcal O$ and symplectic duality”, Asterisque, 2016, no. 384, 75–179  mathscinet  isi
  12. Nakajima H., “Towards a mathematical definition of Coulomb branches of $3$-dimensional $\mathcal{N}=4$ gauge theories, I”, Adv. Theor. Math. Phys., 20:3 (2016), 595–669  crossref  mathscinet  zmath  isi  elib  scopus
  13. Braverman A., Finkelberg M., Nakajima H., “Instanton moduli spaces and $\mathcal W$-algebras”, Asterisque, 2016, no. 385, 1–126  mathscinet  isi
  14. Roy U., Shelley-Abrahamson S., “The B(Infinity) Crystal For a Family of Generalized Quantum Groups”, J. Algebra, 465 (2016), 1–20  crossref  mathscinet  zmath  isi  scopus
  15. Bruzzo U., Pedrini M., Sala F., Szabo R.J., “Framed Sheaves on Root Stacks and Supersymmetric Gauge Theories on Ale Spaces”, Adv. Math., 288 (2016), 1175–1308  crossref  mathscinet  zmath  isi  scopus
  16. Bozec T., “Quivers With Loops and Perverse Sheaves”, Math. Ann., 362:3-4 (2015), 773–797  crossref  mathscinet  zmath  isi  scopus
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  18. Finkelberg M., Rybnikov L., “Quantization of Drinfeld Zastava in Type a”, J. Eur. Math. Soc., 16:2 (2014), 235–271  crossref  mathscinet  zmath  isi  elib  scopus
  19. Cirafici, M; Szabo, RJ, “Curve counting, instantons and McKay correspondences”, Journal of Geometry and Physics, 72 (2013), 54–109  crossref  mathscinet  zmath  adsnasa  isi  scopus
  20. Muthiah, D, “Double MV cycles and the Naito–Sagaki–Saito crystal”, Advances in Mathematics, 240 (2013), 268–290  crossref  mathscinet  zmath  isi  scopus
  21. Letellier, E, “Quiver varieties and the character ring of general linear groups over finite fields”, Journal of the European Mathematical Society, 15:4 (2013), 1375–1455  crossref  mathscinet  zmath  isi  scopus
  22. Alexander Braverman, Michael Finkelberg, “Pursuing the double affine Grassmannian III: convolution with affine zastava”, Mosc. Math. J., 13:2 (2013), 233–265  mathnet  crossref  mathscinet
  23. Nakajima, H., “Quiver varieties and tensor products, II”, Springer Proceedings in Mathematics and Statistics, 40, 2013, 403–428  crossref  mathscinet  zmath  scopus
  24. Braverman A., Finkelberg M., “Pursuing the Double Affine Grassmannian II: Convolution”, Adv. Math., 230:1 (2012), 414–432  crossref  mathscinet  zmath  isi  elib  scopus
  25. Naito S., Sagaki D., Saito Y., “Toward Berenstein-Zelevinsky Data in Affine Type a, Part I: Construction of the Affine Analogs”, Algebraic Groups and Quantum Groups, Contemporary Mathematics, 565, eds. Ariki S., Nakajima H., Saito Y., Shinoda K., Shoji T., Tanisaki T., Amer Mathematical Soc, 2012, 143–184  crossref  mathscinet  zmath  isi
  26. Braverman A., Finkelberg M., “Dynamical Weyl Groups and Equivariant Cohomology of Transversal Slices on Affine Grassmannians”, Math. Res. Lett., 18:3 (2011), 505–512  crossref  mathscinet  zmath  isi  elib  scopus
  27. Cherkis S.A., “Instantons on Gravitons”, Comm Math Phys, 306:2 (2011), 449–483  crossref  mathscinet  zmath  adsnasa  isi  elib  scopus
  28. G. Cerulli Irelli, “Quiver Grassmannians associated with string modules”, J Algebr Comb, 33:2 (2011), 259  crossref
  29. Jan E. Grabowski, “Examples of quantum cluster algebras associated to partial flag varieties”, Journal of Pure and Applied Algebra, 215:7 (2011), 1582  crossref
  30. Braverman A., Finkelberg M., “Pursuing the double affine Grassmannian. I. Transversal slices via instantons on $A_k$-singularities”, Duke Math. J., 152:2 (2010), 175–206  crossref  mathscinet  zmath  isi  elib  scopus
  31. Witten E., “Geometric Langlands from Six Dimensions”, Celebration of the Mathematical Legacy of Raoul Bott, CRM Proceedings & Lecture Notes, 50, 2010, 281–310  crossref  mathscinet  zmath  isi
  32. Karl-Georg Schlesinger, Affine Flag Manifolds and Principal Bundles, 2010, 219  crossref

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