Pseudo-effective cones of projective bundles and weak Zariski decomposition

Abstract

In this article, we consider the projective bundle PX(E) over a smooth complex projective variety X, where E is a semistable bundle on X with c2(End(E)) =0. We give a necessary and sufficient condition to get the equality Nef1(PX(E)) = Eff1(PX(E)) of nef cone and pseudoeffective cone of divisors in PX(E). As an application of our result, we show the equality of nef and pseudoeffective cones of divisors of projective bundles over some special varieties. In particular, we show that weak Zariski decomposition exists on these projective bundles. We also show that a semistable bundle E of rank r ≥ 2 with c2(End(E)) = 0 on a smooth complex projective variety of Picard number 1 is k-homogeneous i.e. Effk(PX(E)) = Nefk(PX(E)) for all 1 ≤ k < r. Finally, we show that weak Zariski decomposition exists for a fibre product PC(E)×CP(E') over a smooth projective curve C.