Stability of Normal Bundles of Space Curves

Abstract

In this paper, we prove that the normal bundle of a general Brill-Noether space curve of degree d and genus g ≥ 2 is stable if and only if (d,g) ∈ \ (5,2), (6,4) \. When g≤1 and the characteristic of the ground field is zero, it is classical that the normal bundle is strictly semistable. We show that this fails in characteristic 2 for all rational curves of even degree.