- 幺半范畴与操作代数研究

A categorification of Grothendieck differential operators on the affine line

组织者

斯拉瓦·皮缅诺夫 , 安吉尔·托莱多

演讲者

Cailan Li

时间

2026年05月11日 16:00 至 17:00

地点

A3-1-301

线上

Zoom 559 700 6085 (BIMSA)

摘要

Given a Hopf pairing between two bialgebras $K$ and $G$, one can define the Hesienberg double $h(G)$, which recovers the classical Heisenberg algebra in the case $K=G=Sym$, the ring of symmetric functions in infinitely many variables. A classical result of Geissinger identifies $Sym$ with the grothendieck ring $K_0$ on the tower of group algebras of the symmetric group $\oplus_n C[S_n]$. Replacing this tower of symmetric group algebras by a tower $T$ of (finite-dimensional) algebras satisfying certain axioms, Savage and Yacobi constructed a categorification of $h(K_0(T))$ acting on its Fock space representation. In this talk we will extend this framework to towers of infinite-dimensional algebras and as an application, categorify the action of Grothendieck differential operators acting on $A^1_{Z[v,v^{-1}]}$.

This talk is based on joint work with Chun-Ju Lai.