Pointed Evaluation Fibers of Rational Curves on del Pezzo Manifolds

Abstract

Let X be a Picard-rank-one del Pezzo manifold of dimension n≥ 4 over an algebraically closed field of characteristic zero. Okamura proved that the unpointed Kontsevich spaces M0,0(X,d) are irreducible of the expected dimension for every d≥ 1. We refine this result by studying pointed evaluation fibers. First, we prove that for every d≥ 1, the one-pointed evaluation morphism M0,1(X,d) X has geometrically irreducible generic fiber. Second, in the very ample cases Hn=3,4,5, we prove that for every d≥ 2, the two-pointed evaluation morphism M0,2(X,d) X× X has geometrically irreducible generic fiber.