Existence of good divisors on Mukai manifolds

Abstract

A normal projective variety X is called Fano if a multiple of the anticanonical Weil divisor, -KX, is an ample Cartier divisor, the index of a Fano variety is the number i(X):=supt: -KX= tH, for some ample Cartier divisor H. Mukai announced, the classification of smooth Fano manifolds X of index i(X)=n-2, under the assumption that the linear system |H| contains a smooth divisor. In this paper we prove that this assumption is always satisfied. Therefore the result of Mukai provide a complete classification of smooth Fano n-folds of index i(X)=n-2, Mukai manifolds.

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