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科学研究
Symmetric Structure for the Endomorphisms of Projective-injective Modules in Parabolic BGG Category O
发布时间:2017-01-09浏览次数:

题目:Symmetric Structure for the Endomorphisms of Projective-injective Modules in Parabolic BGG Category O

报告人:胡峻教授(浙江大学,杰青)

时间:2017年1月9日 16:00-17:00

地点:致远楼107室

摘要:For any singular dominant integral weight $/lambda$ of a complex simple Lie algebra $/mathfrak{g}$, we show that all the indecomposable projective-injective modules in any fixed block of $/mathcal{O}_/lambda^/mathfrak{p}$ have the same Loewy lengths and the endomorphism of any projective-injective module in $/mathcal{O}^/mathfrak{p}_/lambda$ has a symmetric algebra structure, and it is equipped with a homogeneous non-degenerate associative bilinear form of degree equal to one minus that common Loewy length. This generalizes earlier work of Mazorchuk and Stroppel and confirms a conjecture of Khovanov. This talk is based on a joint work with Ngau Lam.

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