On the spectrum of a stable rank 2 vector bundle on P3

Abstract

The spectrum of a stable rank 2 vector bundle E with c1 = 0 on the projective 3-space is a finite sequence of positive integers s(0), ..., s(m) characterizing the Hilbert function of the graded H1-module of E in negative degrees. Hartshorne [Invent. Math. 66 (1982), 165-190] showed that if s(i) = 1 for some i > 0 then s(i+1) = 1, ..., s(m) = 1. We show that if s(0) = 1 then E(1) has a global section whose zero scheme is a double structure on a space curve. We deduce, then, the existence of sequences satisfying Hartshorne's condition that cannot be the spectrum of any stable 2-bundle. This provides a negative answer to a question of Hartshorne and Rao [J. Math. Kyoto Univ. 31 (1991), 789-806].