Ryosuke Kodera scite author profile

Abstract. We prove that a Weyl module for the current Lie algebra associated with a simple Lie algebra of type ADE is rigid, that is, it has a unique Loewy series. Further we use this result to prove that the grading on a Weyl module defined by the degree of currents coincides with another grading which comes from the degree of the homology group of the quiver variety. As a corollary we obtain a formula for the Poincaré polynomials of quiver varieties of type ADE in terms of the energy functions defined on the crystals for tensor products of levelzero fundamental representations of the corresponding quantum affine algebras.

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Quantized Coulomb branches of Jordan quiver gauge theories and cyclotomic rational Cherednik algebras

Kodera¹,

Nakajima²

2018

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We study quantized Coulomb branches of quiver gauge theories of Jordan type. We prove that the quantized Coulomb branch is isomorphic to the spherical graded Cherednik algebra in the unframed case, and is isomorphic to the spherical cyclotomic rational Cherednik algebra in the framed case. We also prove that the quantized Coulomb branch is a deformation of a subquotient of the Yangian of the affine gl(1).

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Extensions between finite-dimensional simple modules over a generalized current Lie algebra

Kodera

2010

Transformation Groups

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Ryosuke Kodera

Quantized Coulomb branches of Jordan quiver gauge theories and cyclotomic rational Cherednik algebras

Quantized Coulomb branches of Jordan quiver gauge theories and cyclotomic rational Cherednik algebras

Loewy Series of Weyl Modules and the Poincaré Polynomials of Quiver Varieties

Quantized Coulomb branches of Jordan quiver gauge theories and cyclotomic rational Cherednik algebras

Extensions between finite-dimensional simple modules over a generalized current Lie algebra

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