Rationality of Mukai varieties over non-closed fields

Abstract

We discuss birational properties of Mukai varieties, i.e., of higher-dimensional analogues of prime Fano threefolds of genus g ∈ \7,8,9,10\ over an arbitrary field k of zero characteristic. In the case of dimension n 4 we prove that these varieties are k-rational if and only if they have a k-point except for the case of genus 9, where we assume n 5. Furthermore, we prove that Mukai varieties of genus g ∈ \7,8,9,10\ and dimension n 5 contain cylinders if they have a k-point. Finally, we prove that the embedding X Gr(3,7) for prime Fano threefolds of genus 12 is defined canonically over any field and use this to give a new proof of the criterion of rationality.