Primitive multiple schemes

Abstract

A primitive multiple scheme is a complex Cohen-Macaulay scheme Y such that the associated reduced scheme X=Yred is smooth, irreducible, and that Y can be locally embedded in a smooth variety of dimension (X)+1. If n is the multiplicity of Y, there is a canonical filtration X=X1⊂ X2⊂·s⊂ Xn=Y, such that Xi is a primitive multiple scheme of multiplicity i. 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 if the line bundle L* by the zero section. Let Zn=spec(C[t]/(tn)). The primitive multiple schemes of multiplicity n are obtained by taking an open cover (Ui) of a smooth variety X and by gluing the schemes Ui× Zn using automorphisms of Uij× Zn that leave Uij invariant. This leads to the study of the sheaf of nonabelian groups Gn of automorphisms of X× Zn that leave the X invariant, and to the study of its first cohomology set. If n≥ 2 there is an obstruction to the extension of Xn to a primitive multiple scheme of multiplicity n+1, which lies in the second cohomology group H2(X,E) of a suitable vector bundle E on X. In this paper we study these obstructions and the parametrization of primitive multiple schemes. As an example we show that if X=Pm with m>=3 all the primitive multiple schemes are trivial. If X=P2, there are only two non trivial primitive multiple schemes, of multiplicities 2 and 4, which are not quasi-projective. On the other hand, if X is a projective bundle over a curve, we show that there are infinite sequences X=X1⊂ X2⊂·s⊂ Xn⊂ Xn+1⊂·s of non trivial primitive multiple schemes.