The arithmetic of tame quotient singularities in dimension 2

Abstract

Let k be a field, X a variety with tame quotient singularities and X X a resolution of singularities. Any smooth rational point x∈ X(k) lifts to X by the Lang-Nishimura theorem, but if x is singular this might be false. For certain types of singularities the rational point is guaranteed to lift, though; these are called singularities of type R. This concept has applications in the study of the fields of moduli of varieties and yields an enhanced version of the Lang-Nishimura theorem where the smoothness assumption is relaxed. We classify completely the tame quotient singularities of type R in dimension 2; in particular, we show that every non-cyclic tame quotient singularity in dimension 2 is of type R, and most cyclic singularities are of type R too.

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