On some moduli spaces of stable vector bundles on cubic and quartic threefolds (Q932300)

Rank 2 ACM vector bundles [see the Introduction or \textit{A. Beauville}, Mich. Math. J. 48, Spec. Vol., 39--64 (2000; Zbl 1076.14534)] on smooth quartic threefolds were classified by \textit{C. Madonna} [Rev. Mat. Complut. 13, No. 2, 287--301 (2000; Zbl 0981.14019)], and the rank 2 ACM vector bundles on the smooth cubic threefolds were classified by \textit{E. Arrondo} and \textit{L. Costa} [Commun. Algebra 28, No. 8, 3899--3911 (2000; Zbl 1004.14010)]. Some of the moduli spaces on cubic and quartic threefolds have been studied in more detail by different authors (see the Introduction), and this paper continues the study of these moduli spaces. The two main results proved here are the following (see Theorems 1-2): The moduli spaces \(M_X(2;1,2)\) and \(M_X(2;0,1)\) on a smooth cubic hypersurface \(X\) are both isomorphic to the Fano surface of lines on \(X\). On the general quartic threefold \(X\): (1) any component of the moduli space \(M_X(2;2,8)\) that contains only ACM bundles is smooth and of dimension 5; (2) \(M_X(2;1,3)\) is isomorphic to the curve of lines on \(X\); (3) \(M_X(2;0,2)\) is isomorphic to the Fano surface of conics on \(X\).