Varieties of general type with the same Betti numbers as P1× P1×…× P1

Abstract

We study quotients Hn of the n-fold product of the upper half plane H by irreducible and torsion-free lattices < PSL2( R)n with the same Betti numbers as the n-fold product ( P1)n of projective lines. Such varieties are called fake products of projective lines or fake ( P1)n. These are higher dimensional analogs of fake quadrics. In this paper we show that the number of fake ( P1)n is finite (independently of n), we give examples of fake ( P1)4 and show that for n>4 there are no fake ( P1)n of the form Hn with contained in the norm-1 group of a maximal order of a quaternion algebra over a real number field.