Brauer Groups of Quot Schemes
Abstract
Let X be an irreducible smooth complex projective curve. Let Q(r,d) be the Quot scheme parametrizing all coherent subsheaves of O rX of rank r and degree -d. There are natural morphisms Q(r,d) Symd(X) and Symd(X) Picd(X). We prove that both these morphisms induce isomorphism of Brauer groups if d ≥ 2. Consequently, the Brauer group of Q(r,d) is identified with the Brauer group of Picd(X) if d ≥ 2.
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