Numerical invariants of Fano 4-folds

Abstract

Let X be a (smooth, complex) Fano 4-fold. For any prime divisor D in X, consider the image of N1(D) in N1(X) under the push-forward of 1-cycles, and let cD be its codimension in N1(X). We define an integral invariant cX of X as the maximal cD, where D varies among all prime divisors in X. One easily sees that cX is at most rhoX-1 (where rho is the Picard number), and that cX is greater or equal than rhoX-rhoD, for any prime divisor D in X. We know from previous works that if cX > 2, then either X is a product of Del Pezzo surfaces and rhoX is at most 18, or cX=3 and rhoX is at most 6. In this paper we show that if cX=2, then rhoX is at most 12.