Liaison theory and the birational geometry of the Hilbert scheme of curves in P3

Abstract

In the Hilbert scheme of curves of degree dr=r(r+1)2 and arithmetic genus gr=r(r+1)(2r-5)6+1 in P3 we prove that there exists a unique component of arithmetically Cohen-Macaulay curves denoted by Cr. For r≥ 3, we verify that the subvariety of curves in Cr with Rao module of rank one always contains a reducible divisor. In particular, in the case of curves of degree 6 and genus 3 we prove that this subvariety is a reducible divisor. Furthermore, the components of such divisor are linearly independent and each component generates an extremal ray of the effective cone Eff(C3).