Orbifold splice quotients and log covers of surface pairs

Abstract

A three-dimensional orbifold (, γi, ni), where is a rational homology sphere, has a universal abelian orbifold covering, whose covering group is the first orbifold homology. A singular pair (X,C), where X is a normal surface singularity with QHS link and C is a Weil divisor, gives rise on its boundary to an orbifold. One studies the preceding orbifold notions in the algebro-geometric setting, in particular defining the universal abelian log cover of a pair. A first key theorem computes the orbifold homology from an appropriate resolution of the pair. In analogy with the case where C is empty and one considers the universal abelian cover, under certain conditions on a resolution graph one can construct pairs and their universal abelian log covers. Such pairs are called orbifold splice quotients.