Irreducibility of the Gorenstein locus of the punctual Hilbert scheme of degree 10

Abstract

Let k be an algebraically closed field of characteristic 0 and let HG(d,N) be the open locus of the Hilbert scheme H(d,N) corresponding to Gorenstein subschemes of degree d in the projective N-space. We proved in a previous paper that HG(d,N) is irreducible for d9 and N1. In the present paper we prove that also HG(10,N) is irreducible for each N1, giving also a complete description of its singular locus.