Deformation and Unobstructedness of Determinantal Schemes

Abstract

Let Hilb p(t)(Pn) be the Hilbert scheme of closed subschemes of Pn with Hilbert polynomial p(t) ∈ Q[t], and let W:= W(b;a;r) be the closure of the locus in Hilb p(t)(Pn) of determinantal schemes defined by the vanishing of the (t-r+1)× (t - r+1) minors of some matrix A of size t× (t+c-1) with ij-enty a homogeneous form of degree aj-bi and with r satisfying \1,2-c\ r < t. W is an irreducible algebraic set. First of all, we compute an upper r-independent bound for the dimension of W in terms of aj and bi which is sharp for r=1. In the linear case (aj = 1, bi=0) and cases sufficiently close, we conjecture and to a certain degree prove that this bound is achieved for all r. Then, we study to what extent W is a generically smooth component of Hilb p(t)(Pn). Under some weak numerical assumptions on the integers aj and bi (or under some depth conditions) we conjecture and often prove that W is a generically smooth component. Moreover, we also study the depth of the normal module of the homogeneous coordinate ring of (X)∈ W and of a closely related module. We conjecture, and in some cases prove, that their codepth is often 1 (resp. r). These results extend previous results on standard determinantal schemes to determinantal schemes; i.e. previous results of the authors on W(b;a;1) to W with 1 r < t and c 2-r. Finally, deformations of exterior powers of the cokernel of the map determined by A are studied and proven to be given as deformations of X ⊂ Pn if X 3. The work contains many examples which illustrate the results obtained and a considerable number of open problems; some of them are collected as conjectures in the final section.