Deformations and moduli of irregular canonical covers with K2=4pg-8

Abstract

In this article, we study the moduli of irregular surfaces of general type with at worst canonical singularities satisfying KX2 = 4pg(X)-8, for any even integer pg≥ 4. These surfaces also have unbounded irregularity q. We carry out our study by investigating the deformations of the canonical morphism :X PN, where is Galois of degree 4. These canonical covers are classified in by the first two authors into four distinct families. We show that any deformation of factors through a double cover of a ruled surface and, hence, is never birational. More interestingly, we prove that, with two exceptions, a general deformation of is two-to-one onto its image, whose normalization is a ruled surface of appropriate irregularity. We also show that with the exception of one family, the deformations of X are unobstructed, and consequently, X belongs to a unique irreducible component of the Gieseker moduli space, which we prove is uniruled. As a result of all this, we show the existence of infinitely many moduli spaces, satisfying the strict Beauville inequality pg > 2q-4, with an irreducible component that has a proper "quadruple" sublocus where the degree of the canonical morphism jumps up. The existence of jumping subloci is a contrast with the moduli of surfaces with KX2 = 2pg - 4, studied by Horikawa. There is a similarity and difference to the moduli of curves of genus g≥ 3, for, like in the case of curves, the degree of the canonical morphism goes down outside a closed sublocus but, unlike in the case of curves, it is never birational.