Categories of split filtrations and graded quiver varieties

Abstract

By the work of Hernandez-Leclerc, Leclerc-Plamondon, and Keller-Scherotzke, affine graded Nakajima quiver varieties associated with a Dynkin quiver Q admit an algebraic description in terms of modules over the singular Nakajima category S and a stratification functor to the derived category of Q. In this paper, we extend this framework to Nakajima's n-fold affine graded tensor product varieties, which allow one to geometrically realize n-fold tensor products of standard modules over the quantum affine algebra. We introduce a category of filtrations with splitting of length n of modules over a category and show that it is equivalent to the module category of a triangular matrix category. Applied to the singular Nakajima category, this yields a category Sn-filt whose modules are parametrized by the points of the n-fold tensor product varieties. Generalizing the results of Keller-Scherotzke from S to Sn-filt, we prove that the stable category of pseudo-coherent Gorenstein projective Sn-filt-modules is triangle equivalent to the derived category of the algebra of n × n upper triangular matrices over the path algebra of Q, and we obtain a corresponding stratification functor.