Fano threefolds of genus 12 with large automorphism group in positive and mixed characteristic

Abstract

We study prime Fano threefolds of genus 12 (V22-varieties) with positive-dimensional automorphism groups in positive and mixed characteristic. We classify such varieties over any perfect field. In particular, we prove that V22-varieties of Mukai-Umemura type over k exist if and only if char\ k ≠ 2, 5. We also prove the same result for Ga-type. As arithmetic applications, we show that the Shafarevich conjecture holds for V22-varieties of Mukai-Umemura type and of Gm-type, while it fails for V22-varieties of Ga-type. Moreover, we prove that there exists V22-varieties over Z, whereas there do not exist V22-varieties over Z whose generic fiber has a positive-dimensional automorphism group.