Simply transitive quaternionic lattices of rank 2 over Fq(t) and a non-classical fake quadric

Abstract

We construct an infinite series of simply transitive irreducible lattices in PGL2(Fq((t))) × PGL2(Fq((t))) by means of a quaternion algebra over Fq(t). The lattices depend on an odd prime power q = pr and a parameter τ\ in Fq* different from 1, and are the fundamental group of a square complex with just one vertex and universal covering Tq+1 × Tq+1, a product of trees with constant valency q + 1. Our lattices give rise via non-archimedian uniformization to smooth projective surfaces of general type over Fq((t)) with ample canonical class, Chern ratio (c1)2/c2 = 2, trivial Albanese variety and non-reduced Picard scheme. For q = 3, the Zariski-Euler characteristic attains its minimal value = 1: the surface is a non-classical fake quadric.