Birational geometry of Fano direct products
Abstract
We prove birational superrigidity of direct products V=F1×...× FK of primitive Fano varieties of the following two types: either Fi⊂ PM is a general hypersurface of degree M, M≥ 6, or Fiσ PM is a general double space of index 1, M≥ 3. In particular, each structure of a rationally connected fiber space on V is given by a projection onto a direct factor. The proof is based on the connectedness principle of Shokurov and Koll\' ar and the technique of hypertangent divisors.
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