The boundary of K-moduli of prime Fano threefolds of genus twelve

Abstract

We study the K-moduli stack of prime Fano threefolds of genus twelve, known as V22. We prove that its boundary, which parametrizes singular members, is purely divisorial and consists of four irreducible components corresponding to the four families of Prokhorov's one-nodal V22. A key ingredient is a modular relation between Fano threefolds X and their anticanonical K3 surfaces S. We prove that the forgetful morphism from the moduli of Fano--K3 pairs (X,S) where X is a K-semistable degeneration of V22 to the moduli space of genus 12 polarized K3 surfaces (S,-KX|S) is an open immersion. In particular, the K-moduli of V22 is governed by the moduli of their anticanonical K3 surfaces, providing a modular realization of Mukai's philosophy. Along the way, we develop a general deformation framework for Fano threefolds of large volume, which may be useful beyond the study of K-moduli.

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