Džambić, Amir; Roulleau, Xavier Automorphisms and quotients of quaternionic fake quadrics. (English) Zbl 1292.14018 Pac. J. Math. 267, No. 1, 91-120 (2014). A \(\mathbb Q\)-homology quadric surface is a normal projective algbraic surfaces with the same Betti number as the quadric surface in \(\mathbb P^3\), i.e., \(b_1=1\) and \(b_2=2\). The article under review is devoted to study the so-called quaternionic fake quadrics, i.e., quadric surfaces of general type of the form \(\Gamma \setminus \mathbb H \times \mathbb H\) with \(\Gamma\) a cocompact irreducible arithmetic lattices in \(\text{Aut}(\mathbb H) \times \text{Aut}(\mathbb H)\), where \(\mathbb H\) is the complex upper half plane. The authors study the possible automorphism group of such a surface, provide examples, and obtain the minimal desingularization of the quotient of a quaternionic fake quadrics by a group of automorphisms, some of which give new examples of surfaces of general type with \(q=p_g=0\). Reviewer: Xin Lu (Mainz) Cited in 1 Document MSC: 14G35 Modular and Shimura varieties 14J10 Families, moduli, classification: algebraic theory 14J29 Surfaces of general type 14J50 Automorphisms of surfaces and higher-dimensional varieties 11F06 Structure of modular groups and generalizations; arithmetic groups 11R52 Quaternion and other division algebras: arithmetic, zeta functions Keywords:\(\mathbb Q\)-homology quadrics; surfaces with \(q=p_g=0\); fake quadrics; surfaces of general type; automorphisms PDF BibTeX XML Cite \textit{A. Džambić} and \textit{X. Roulleau}, Pac. J. Math. 267, No. 1, 91--120 (2014; Zbl 1292.14018) Full Text: DOI arXiv