Let X be a smooth, complete and connected curve and G be a simple and simply connected algebraic group over C. We calculate the Picard group of the moduli stack of quasi-parabolic G-bundles and identify the spaces of sections of its members to the conformal blocs of Tsuchiya, Ueno and Yamada. We describe the canonical sheaf on these stacks and show that they admit a unique square root, which we will construct explicitly. Finally we show how the results on the stacks apply to the coarse moduli spaces and recover (and extend) the Drezet-Narasimhan theorem. We show moreover that the coarse moduli spaces of semi-stable SO r -bundles are not locally factorial for r ≥ 7.
Moduli spaces of semistable sheaves on a K3 or abelian surface with respect
to a general ample divisor are shown to be locally factorial, with the
exception of symmetric products of a K3 or abelian surface and the class of
moduli spaces found by O'Grady. Consequently, since singular moduli space that
do not belong to these exceptional cases have singularities in codimension
$\geq4$ they do no admit projective symplectic resolutions
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