Blowing-ups of primitive multiple schemes
Abstract
A primitive multiple scheme is a Cohen-Macaulay scheme X such that the associated reduced scheme X= Xred is smooth, irreducible, and that X can be locally embedded in a smooth variety of dimension (X)+1. If IX is the ideal sheaf of X, L= IX/ IX2 is a line bundle on X, called the associated line bundle of X. The simplest example is the trivial primitive multiple scheme of multiplicity n associated to a line bundle L on X: it is the n-th infinitesimal neighborhood of X, embedded in the line bundle L* by the zero section. A subscheme Z of X is called good if Zred is smooth and connected, and if d= codim(Z) and IZ, X is the ideal sheaf of Z, then for every closed point z∈ Z, IZ, X,z can be generated by d elements. Two kinds of subschemes Z of X will be considered: the closed smooth subschemes of X, seen as subschemes of X, and the good subschemes. In the two cases, the blowing-up BZ, X of X along Z is a primitive multiple scheme of multiplicity n, and its underlying smooth scheme is the blowing-up BZred,X of X along Zred. Additional results are obtained in the case of hypersurfaces or points of X. We treat the case of X= P2, with Z a single point P. Let p: P2 P2 be the blowing-up of P2 along P. We find all primitive double schemes X, Y, with Yred= P2, Xred= P2, such that there is a morphism Y X inducing p and an isomorphism Y p-1(P) X \P\. We obtain in this way the list of all K3-carpets with underlying smooth variety P2.
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