The Deligne-Mostow List and Special Families of Surfaces.

We study whether there exist infinitely many surfaces with given discrete invariants for which the $$H^2$$ is of CM type. This is a surface analogue of a conjecture of Coleman about curves. We construct a large number of examples of families of surfaces with $$p_{\text{g}} = 1$$ that in the moduli space cut out a special subvariety; these provide a positive answer to our question. Most of these are families of K3 surfaces but we also obtain some families of surfaces of general type. As input for our construction we use the work of Deligne and Mostow. Finally we prove that a very general K3 surface cannot be dominated by a product of curves of small genus. [ABSTRACT FROM AUTHOR]