On the rationality and the finite dimensionality of a cubic fourfold

Abstract

Let X be a cubic fourfold in P5C. We prove that, assuming the Hodge conjecture for the product S × S, where S is a complex surface, and the finite dimensionality of the Chow motive h(S), there are at most a countable number of decomposable integral polarized Hodge structures, arising from the fibers of a family of smooth projective surfaces. According to the results in [ABB] this is related to a conjecture proving the irrationality of a very general X. If X is special, in the sense of B.Hasset, and F(X) S[2], with S a K3 surface associated to X, then we show that the Chow motive h(X) contains as a direct summand a "transcendental motive" t(X) such that t(X) t2(S)(1). The motive of X is finite dimensional if and only if S has a finite dimensional motive, in which case t(X) is indecomposable. Similarly, if X is very general and the motive h(X) is finite dimensional, then t(X) is indecomposable