Brauer group of moduli of parabolic symplectic bundles
Abstract
Let X be a smooth connected complex projective curve of genus g, with g\,≥\, 3. Fix an integer r≥ 2, a finite subset D\, ⊂\, X, and a line bundle L on X. We compute the Brauer group of the smooth locus of the moduli space of parabolic symplectic stable bundles of rank r on X equipped with a symplectic form taking values in L(D), where L(D) is given the trivial parabolic structure.
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