Stable Ulrich bundles on cubic fourfolds

Abstract

In this paper, we give necessary and sufficient conditions for the existence of Ulrich bundles on cubic fourfold X of given rank r. As consequences, we show that for every integer r 2 there exists a family of indecomposable rank r Ulrich bundles on the certain cubic fourfolds, depending roughly on r parameters, and in particular they are of wild representation type; special surfaces on the cubic fourfolds are explicitly constructed by Macaulay2; a new 19-dimensional family of projective ten-dimensional irreducible holomorphic symplectic manifolds associated to a certain cubic fourfold is constructed; and for certain cubic fourfold X, there exist arithmetically Cohen-Macaulay smooth surface Y ⊂ X which are not an intersection X T for a codimension two subvariety T ⊂ P5.