On the canonical map of some surfaces isogenous to a product

Abstract

We give new contributions to the existence problem of canonical surfaces of high degree. We construct several families (indeed, connected components of the moduli space) of surfaces S of general type with pg=5,6 whose canonical map has image of very high degree, d=48 for pg=5, d=56 for pg=6. And a connected component of the moduli space consisting of surfaces S with K2S = 40, pg=4, q=0 whose canonical map has always degree ≥ 2, and, for the general surface, of degree 2 onto a canonical surface Y with K2Y = 12, pg=4, q=0. The surfaces we consider are SIP 's, i.e. surfaces S isogenous to a product of curves (C1 × C2 )/ G; in our examples the group G is elementary abelian, G = (Z/m)k. We also establish some basic results concerning the canonical maps of any surface isogenous to a product, basing on elementary representation theory.