Factorial threefolds and Shokurov vanishing

Abstract

We prove the factoriality of the following nodal threefolds: a complete intersection of hypersurfaces F and G⊂P5 of degree n and k respectively, where G is smooth, |Sing(F G)|≤slant(n+k-2)(n-1)/5, n≥slant k; a double cover of a smooth hypersurface F⊂P4 of degree n branched over a surface that is cut out on F by a hypersurface G of degree 2r≥slant n, and |Sing(F G)|≤slant(2r+n-2)r/4.

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