Applications of principal isogenies to constructions of ball quotient surfaces

Abstract

Let (( B / 1)', T(1)) be \'a torsion free toroidal compactification with abelian minimal model (A1, D(1)). An arbitrary principal isogeny μa : A2 → A1, a ∈ C pulls-back (A1, D(1)) to the abelian minimal model (A2, D(2)) of a torsion free toroidal compactification (( B / 2)', D(2)). The present work makes use of the isogeny pull-backs of abelian ball quotient models, towards the construction of infinite series of mutually non-birational co-abelian torsion free Galois covers (( B / n)', T(n)) of a ball quotient compactification B / H of Kodaira dimension ( B / H) ≤ 0. It provides also infinite series of birational models of certain B / H.