Pluricanonical Geometry of Varieties Isogenous to a Product and Abelian Covers
Abstract
We study canonical and pluricanonical maps of varieties isogenous to a product of curves, i.e., quotients of the form X = (C1 × … × Cn)/G with g(Ci) 2 and G acting freely. For this purpose, we provide a technical result which is of general interest: a decomposition theorem for pluricanonical systems of abelian covers. This theorem provides an effective tool for the explicit study of geometric properties, such as base loci and the birationality of pluricanonical maps. For threefolds isogenous to a product, we prove that the 4-canonical map is birational for pg 5 and construct an example attaining the maximal canonical degree for this class of threefolds. In this example, the canonical map is the normalization of its image, which admits isolated non-normal singularities. Computational classifications also reveal threefolds where the bicanonical map fails to be birational, even in the absence of genus-2 fibrations. This illustrates an interesting phenomenon similar to the non-standard case for surfaces.
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