Classification of Horikawa surfaces with T-singularities

Abstract

We classify all projective surfaces with only T-singularities, ample canonical class, and K2=2pg-4. In this way, we identify all surfaces, smoothable or not, with only T-singularities in the Koll\'ar--Shepherd-Barron--Alexeev (KSBA) moduli space of Horikawa surfaces. We also prove that they are not smoothable when pg ≥ 10, except for the Lee-Park (Fintushel-Stern) examples, which we show to have only one deformation type unless pg=6 (in which case they have two). This demonstrates that the challenging Horikawa problem cannot be addressed through complex T-degenerations. We propose new questions regarding diffeomorphism types based on our classification. Furthermore, the techniques developed in this paper enable us to classify all KSBA surfaces with only T-singularities and K2≤ 2pg-3, for example, quintic surfaces and I-surfaces.

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