Linear stability and rank two Clifford indices of algebraic curves with applications

Abstract

We prove that any vector bundle computing the rank-two Clifford index of a smooth projective algebraic curve is linearly semistable. We also identify conditions under which such bundles become linearly stable, thereby addressing a question posed by A. Castorena, G. H. Hitching and E. Luna in the rank-two case. Furthermore, we demostrate that in certain special cases, this property is equivalent to the (semi)stability of the associated Lazarsfeld-Mukai bundles. This yields a positive answer, in specific cases, to a generalized version of a conjecture proposed by Mistretta and Stoppino. We also study the moduli space S0(n,d,5) of generated α-stable coherent systems of type (n,d,5) for small values of α and n=2,3. We show that a general element of an irreducible component of X ⊂eq S0(2,d,5) or X ⊂eq S0(3,d,5) is linearly stable whenever 2δ2 ≤ d ≤ 3g2. As an application of this, we prove that Butler's conjecture holds non-trivially for coherent systems of type (2,d,5) within the given range for d.