KLR and Schur algebras for curves and semi-cuspidal representations

Abstract

Given a smooth curve C, we define and study analogues of KLR algebras and quiver Schur algebras, where quiver representations are replaced by torsion sheaves on C. In particular, they provide a geometric realization for certain affinized symmetric algebras. When C= P1, a version of curve Schur algebra turns out to be Morita equivalent to the imaginary semi-cuspidal category of the Kronecker quiver in any characteristic. As a consequence, we argue that one should not expect to have a reasonable theory of parity sheaves for affine quivers.