Some extension algebras for standard modules over KLR algebras of type A

Abstract

Khovanov-Lauda-Rouquier algebras Rθ of finite Lie type are affine quasihereditary with standard modules (π) labeled by Kostant partitions of θ. Let be the direct sum of all standard modules. It is known that the Yoneda algebra Eθ:=ExtRθ*(, ) carries a structure of an A∞-algebra which can be used to reconstruct the category of standardly filtered Rθ-modules. In this paper, we explicitly describe Eθ in two special cases: (1) when θ is a positive root in type A, and (2) when θ is of Lie type A2. In these cases, Eθ turns out to be torsion free and intrinsically formal. We provide an example to show that the A∞-algebra Eθ is non-formal in general.