On the Hilbert scheme of smooth curves in P4 of degree d = g+1 and genus g with negative Brill-Noether number

Abstract

We denote by Hd,g,r the Hilbert scheme of smooth curves, which is the union of components whose general point corresponds to a smooth irreducible and non-degenerate curve of degree d and genus g in r. In this article, we show that for low genus g outside the Brill-Noether range, the Hilbert scheme Hg+1,g,4 is non-empty whenever g 9 and irreducible whose only component generically consists of linearly normal curves unless g=9 or g=12. This complements the validity of the original assertion of Severi regarding the irreducibility of Hd,g,r outside the Brill-Nother range for d=g+1 and r=4.