Abstract
A pseudoeffective divisor is said to have a weak Zariski decomposition if it can be, up to a birational transformation, numerically written as the sum of a nef and an effective divisor. In this paper we consider the problem of the existence of a weak Zariski decomposition for each pseudoeffective divisor on a variety \(X= \mathbb {P}(\fancyscript{E})\), where \(\fancyscript{E}\) is a vector bundle on a smooth complex projective variety \(Z\) of Picard number one. We prove the existence of such a decomposition in a number of meaningful situations.
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