K-stability of pointless del Pezzo surfaces and Fano 3-folds
Abstract
We explore connections between existence of -rational points for Fano varieties defined over , a subfield of C, and existence of K\"ahler-Einstein metrics on their geometric models. First, we show that geometric models of del Pezzo surfaces with at worst quotient singularities defined over ⊂C admit (orbifold) K\"ahler--Einstein metrics if they do not have -rational points. Then we prove the same result for smooth Fano 3-folds with 8 exceptions. Consequently, we explicitly describe several families of pointless Fano 3-folds whose geometric models admit K\"ahler-Einstein metrics. In particular, we obtain new examples of prime Fano 3-folds of genus 12 that admit K\"ahler--Einstein metrics. Our result can also be used to prove existence of rational points for certain Fano varieties, for example for any smooth Fano 3-fold over ⊂C whose geometric model is strictly K-semistable.
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