On varieties whose universal cover is a product of curves

Abstract

We investigate a necessary condition for a compact complex manifold X of dimension n in order that its universal cover be the Cartesian product Cn of a curve C = 1 or : the existence of a semispecial tensor ω. A semispecial tensor is a non zero section 0 ≠ ω ∈ H0(X, Sn1X (-KX) η) ), where η is an invertible sheaf of 2-torsion (i.e., η2 X). We show that this condition works out nicely, as a sufficient condition, when coupled with some other simple hypothesis, in the case of dimension n= 2 or n= 3; but it is not sufficient alone, even in dimension 2. In the case of K\"ahler surfaces we use the above results in order to give a characterization of the surfaces whose universal cover is a product of two curves, distinguishing the 6 possible cases.