On the unirationality of quadric bundles
Abstract
We prove that a general n-fold quadric bundle Qn-1→P1, over a number field, with (-KQn-1)n > 0 and discriminant of odd degree δQn-1 is unirational, and that the same holds for quadric bundles over an arbitrary infinite field provided that Qn-1 has a point, is otherwise general and n≤ 5. As a consequence we get the unirationality of a general n-fold quadric bundle Qh→Pn-h with discriminant of odd degree δQh≤ 3h+4, and of any smooth 4-fold quadric bundle Q2→P2, over an algebraically closed field, with δQ2≤ 12.
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