Slope Semistability and Positive cones of Grassmann bundles
Abstract
Let E be a vector bundle of rank r on a smooth complex projective variety X. In this article, we compute the nef and pseudoeffective cones of divisors in the Grassmann bundle GrX(k,E) parametrizing k-dimensional subspaces of the fibers of E, where 1≤ k ≤ rank(E), under assumptions on X as well as on the vector bundle E. In particular, we show that nef cone and the pseudoeffective cone of GrX(k,E) coincide if and only if E is a slope semistable bundle on X with c2(End(E))=0. We also discuss about the nefness and ampleness of the universal quotient bundle Qk on GrX(k,E).
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