Divisor class groups of double covers over projective spaces
Abstract
In this paper, we prove that the divisor class group of a double cover of the complex projective space Pn is generated by divisorial sheaves whose direct images split into direct sums of two invertible sheaves on Pn. This result shows that any locally free sheaf of rank two on Pn is generated by direct sums of line bundles on Pn via some double cover. Moreover, we give a condition for an irreducible divisor on Pn to be a splitting divisor for a double cover whose divisor class group is finitely generated.
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