The Hesse pencil and polarizations of type $(1,3)$ on Abelian surfaces

In this short note we prove two theorems, the first one is a sharpening of a result of Lange and Sernesi: the discriminant curve W of a general Abelian surface $A$ endowed with an irreducible polarization $D$ of type $(1,3)$ is an irreducible curve of degree $18$ whose singularities are exactly $36$ nodes and $72$ cusps. Moreover, we analyze the degeneration of the discriminant curve $W$ and its singularities as $A$ tends to the product of two equal elliptic curves. The second theorem, using the first one in order to prove a transversality assertion, shows that the general element of a family of surfaces constructed by Alessandro and Catanese is a smooth surface, thereby proving the existence of a new family of minimal surfaces of general type with $p_g=q=2, K^2=6$ and Albanese map of degree $3$.
Comment: 13 pages, dedicated to the memory of Alberto Collino