Effective cone of a Grassmann bundle over a curve defined over Fp
Abstract
Let X be an irreducible smooth projective curve defined over Fp and E a vector bundle on X of rank at least two. For any 1\, ≤\, r\, <\, rank(E), let Grr(E) be the Grassmann bundle over X parametrizing all the r dimensional quotients of the fibers of E. We prove that the effective cone in NS( Grr(E)) Z R coincides with the pseudo-effective cone in NS( Grr(E)) Z R. When r\,=\,1 or rank(E)-1, this was proved by A. Moriwaki.
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