Genera of curves on a very general surface in P3

Abstract

In this paper we consider the question of determining the geometric genera of irreducible curves lying on a very general surface S of degree d at least 5 in P3 (the cases d ≤slant 4 are well known). We introduce the set Gaps(d) of all non-negative integers which are not realized as geometric genera of irreducible curves on S. We prove that Gaps(d) is finite and, in particular, that Gaps(5)= \0,1,2\. The set Gaps(d) is the union of finitely many disjoint and separated integer intervals. The first of them, according to a theorem of Xu, is Gaps0(d):=[0, d(d-3)2 - 3]. We show that the next one is Gaps1(d):= [d2-3d+42, d2-2d-9] for all d ≥slant 6.