On the tangent space to the Hilbert scheme of points in P3

Abstract

In this paper we study the tangent space to the Hilbert scheme Hilbd P3, motivated by Haiman's work on Hilbd P2 and by a long-standing conjecture of Briancon and Iarrobino on the most singular point in Hilbd Pn. For points parametrizing monomial subschemes, we consider a decomposition of the tangent space into six distinguished subspaces, and show that a fat point exhibits an extremal behavior in this respect. This decomposition is also used to characterize smooth monomial points on the Hilbert scheme. We prove the first Briancon-Iarrobino conjecture up to a factor of 4/3, and improve the known asymptotic bound on the dimension of Hilbd P3. Furthermore, we construct infinitely many counterexamples to the second Briancon-Iarrobino conjecture, and we also settle a weaker conjecture of Sturmfels in the negative.