Daisuke Yamakawa, “Quiver Varieties with Multiplicities, Weyl Groups of Non-Symmetric Kac–Moody Algebras, and Painlevé Equations”, SIGMA, 6 (2010), 087, 43 pp.

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Symmetry, Integrability and Geometry: Methods and Applications, 2010, Volume 6, 087, 43 pp.
DOI: https://doi.org/10.3842/SIGMA.2010.087 (Mi sigma545)

This article is cited in 5 scientific papers (total in 5 papers)

Quiver Varieties with Multiplicities, Weyl Groups of Non-Symmetric Kac–Moody Algebras, and Painlevé Equations

Daisuke Yamakawa^ab

^a Department of Mathematics, Graduate School of Science, Kobe University, Rokko, Kobe 657-8501, Japan
^b Centre de mathématiques Laurent Schwartz, École Polytechnique, CNRS UMR 7640, ANR SÉDIGA, 91128 Palaiseau Cedex, France

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DOI: https://doi.org/10.3842/SIGMA.2010.087

Abstract: To a finite quiver equipped with a positive integer on each of its vertices, we associate a holomorphic symplectic manifold having some parameters. This coincides with Nakajima's quiver variety with no stability parameter/framing if the integers attached on the vertices are all equal to one. The construction of reflection functors for quiver varieties are generalized to our case, in which these relate to simple reflections in the Weyl group of some symmetrizable, possibly non-symmetric Kac–Moody algebra. The moduli spaces of meromorphic connections on the rank 2 trivial bundle over the Riemann sphere are described as our manifolds. In our picture, the list of Dynkin diagrams for Painlevé equations is slightly different from (but equivalent to) Okamoto's.

Keywords: quiver variety; quiver variety with multiplicities; non-symmetric Kac–Moody algebra; Painlevé equation; meromorphic connection; reflection functor; middle convolution.

Received: March 19, 2010; in final form October 18, 2010; Published online October 26, 2010

Bibliographic databases:

Document Type: Article

MSC: 53D30; 16G20; 20F55; 34M55

Language: English

Citation: Daisuke Yamakawa, “Quiver Varieties with Multiplicities, Weyl Groups of Non-Symmetric Kac–Moody Algebras, and Painlevé Equations”, SIGMA, 6 (2010), 087, 43 pp.

Citation in format AMSBIB

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This publication is cited in the following 5 articles:

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Symmetry, Integrability and Geometry: Methods and Applications

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