A Characterization of Varieties whose Universal Cover is the Polydisk or a Tube Domain

Catanese and Franciosi defined a semispecial tensor as a (non zero) section of the n-th symmetric power of the cotangent bundle twisted by the anticanonical divisor and by a 2-torsion line bundle. A slope zero tensor is instead a section of the nm-th symmetric power of the cotangent bundle twisted by m times the anticanonical divisor. With these definitions we have: Theorem 1. The universal cover of X is the polydisk iff 1) holds. 1) X has ample canonical bundle and admits a semispecial tensor such that at some point p the corresponding hypersurface in the projectivized tangent space is reduced. Theorem 2. If X has ample canonical bundle it admits a slope zero tensor if and only if the universal cover of X is a bounded symmetric domain D of tube type. The domain D is determined by the multiplicities of the irreducible components of the corresponding tangential hypersurface. We have then a corollary which extends previous results by Kazhdan. Corollary. Assume that the universal covering of X is a bounded symmetric domain D of tube type. Let X^s be a Galois conjugate of X : then also the universal cover of X^s is biholomorphic to D.