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arxiv: 2209.08877 · v2 · pith:5V5H7DIBnew · submitted 2022-09-19 · 🧮 math.AG

Unimodal singularities and boundary divisors in the KSBA moduli of a class of Horikawa surfaces

classification 🧮 math.AG
keywords surfacescompactificationdivisorsmathbfboundaryeightminimalmoduli
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Smooth minimal surfaces of general type with $K^2=1$, $p_g=2$, and $q=0$ constitute a fundamental example in the geography of algebraic surfaces, and the 28-dimensional moduli space $\mathbf{M}$ of their canonical models admits a modular compactification $\overline{\mathbf{M}}$ via the minimal model program. We describe eight new irreducible boundary divisors in such compactification parametrizing reducible stable surfaces. Additionally, we study the relation with the GIT compactification of $\mathbf{M}$ and the Hodge theory of the degenerate surfaces that the eight divisors parametrize.

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  1. Quasi-Projective Moduli for Polarized klt Good Minimal Models

    math.AG 2026-05 unverdicted novelty 5.0

    The normalization of the moduli space of polarized klt good minimal models of arbitrary Kodaira dimension is quasi-projective.