Singularities of pluri-fundamental divisors on Gorenstein Fano varieties of coindex 4

Abstract

Let X be a Gorenstein canonical Fano variety of coindex 4 and dimension n with H fundamental divisor. Assume h0(X, H) ≥ n -2. We prove that a general element of the linear system |mH| has at worst canonical singularities for any integer m ≥ 1. When X has terminal singularities and n ≥ 5, we show that a general element of |mH| has at worst terminal singularities for any integer m ≥ 1. When n=4, we give an example of Gorenstein terminal Fano fourfold X such that a general element of |H| does not have terminal singularities.