Birational Geometry of Quot Schemes on smooth projective curves via Stable Pairs

Abstract

Let C be a smooth projective curve of genus g ≥ 2 over C, and let E0 be a vector bundle on C. We investigate the birational geometry of the Quot scheme QuotC(E0, k, n), which parametrizes quotients of E0 of rank k and degree n, and its fiber QL over Picn(C) for n 0. Our main tool is the moduli space of stable pairs, which yields small Q-factorial modifications (SQMs) of QuotC(E0, k, n) and QL. We explicitly describe the nef, movable, and effective cones of each SQM. Consequently, we prove that QL is a Mori dream space and that the determinant morphism QuotC(E0, k, n) Picn(C) is a Mori dream morphism.