Families of Smooth Rational Curves of Small Degree on the Fano Variety of Degree 5 of Main Series

In this paper we consider some families of smooth rational curves of degree 2, 3 and 4 on a smooth Fano threefold X which is a linear section of the Grassmanian G(1, 4) under the Pl¨ucker embedding. We prove that these families are irreducible. The proof of the irreducibility of the families of curves of degree d is based on the study of degeneration of a rational curve of degree d into a curve which decomposes into an irreducible rational curve of degree d−1 and a projective line intersecting transversally at a point. We prove that the Hilbert scheme of curves of degree d on X is smooth at the point corresponding to such a reducible curve. Then calculations in the framework of deformation theory show that such a curve varies into a smooth rational curve of degree d. Thus, the set of reducible curves of degree d of the above type lies in the closure of a unique component of the Hilbert scheme of smooth rational curves of degree d on X. From this fact and the irreducibility of the Hilbert scheme of smooth rational curves of degree d on the Grassmannian G(1, 4) one deduces the irreducibility of the Hilbert scheme of smooth rational curves of degree d on a general Fano threefold X.

1. Исковских В.А. Трехмерные многообразия Фано. I // Изв. АН СССР. Сер. матем. 1977. Т. 41, № 3. С. 516–562. (English transl.: Iskovskikh V. A. Fano 3-folds. I // Mathematics of the USSR-Izvestiya. 1978. V. 12:3. P. 469–506.)

2. Stromme S.A. On parametrized rational curves in Grassmann varieties // Lectures Notes in Math. 1266. Springer, 1987. P. 251–272.

3. Hartshorne R. Deformation Theory. Springer, 2010.