On the birational geometry of conic bundles over the projective space

Abstract

Let π:Z→Pn-1 be a general minimal n-fold conic bundle with a hypersurface BZ⊂Pn-1 of degree d as discriminant. We prove that if d≥ 4n+1 then -KZ is not pseudo-effective, and that if d = 4n then none of the integral multiples of -KZ is effective. Finally, we provide examples of smooth unirational n-fold conic bundles π:Z→Pn-1 with discriminant of arbitrarily high degree.

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