Projective Poincar\'e and Picard bundles for moduli spaces of vector bundles over nodal curves

Abstract

Let U'sL(n,d) be the moduli space of stable vector bundles of rank n with determinant L where L is a fixed line bundle of degree d over a nodal curve Y. We prove that the projective Poincare bundle on Y × U'sL(n,d) and the projective Picard bundle on U'sL(n,d) are stable for suitable polarisation. For a nonsingular point x ∈ Y, we show that the restriction of the projective Poincare bundle to x × U'sL(n,d) is stable for any polarisation. We prove that for arithmetic genus g 3 and for g=n=2, d odd, the Picard group of the moduli space U'L(n,d) of semistable vector bundles of rank n with determinant L of degree d is isomorphic to Z.