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Post-groups, post-groupoids and the Yang-Baxter equation

  • Speaker:Yunhe Sheng (Jilin University)
  • TIME:2024-06-06 20:00 - 2024-06-06 21:00
  • LOCATION:Online

 

Recording: https://meeting.tencent.com/v2/cloud-record/share?id=ea1bda53-6962-4b40-b1cc-fc43ef746ef3&from=3&is-single=false&record_type=2

 

Abstract: We introduce the notion of post-groups, which are the underlying structures of Rota-Baxter operators on groups. The differentiation of post-Lie groups gives post-Lie algebras. Post-groups are also related to braces and Lie-Butcher groups, and give rise to set-theoretical solutions of Yang-Baxter equations. We further introduce the notion of post-groupoids, whose differentiations are post-Lie algebroids. We show that post-groupoids give quiver-theoretical solutions of the Yang-Baxter equation on the underlying quiver of the subadjacent groupoids.

The talk is based on the joint work with Chengming Bai, Li Guo, Rong Tang and Chenchang Zhu.

 

Bio: Yunhe Sheng is a Professor in Jilin University. He received his Ph. D degree from Peking University in 2009, and then spent one year in Goettingen University as a post-doctor. His research interests are Poisson geometry, higher Lie theory and mathematical physics.

 

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