2-Representations of sl2 from Quasi-Maps

Abstract

We describe a new type of 2-representations, using coherent sheaves. Feigin, Finkelberg, Kuznetsov, Mirkovi\'c and Braverman have provided a construction of Verma modules for complex semi-simple Lie algebras using based quasi-map spaces from P1 to flag varieties (zastavas). We consider here the case of sl2, where the zastavas are smooth, and are mere affine spaces. We show that coherent sheaves on zastavas provide a 2-Verma module for sl2 in the sense of Naisse-Vaz. Adding a superpotential and considering matrix factorizations, we obtain a realization of simple 2-representations of sl2.