Plane model-fields of definition, fields of definition, the field of moduli of smooth plane curves

Abstract

Given a smooth plane curve C of genus g≥ 3 over an algebraically closed field k, a field L⊂eqk is said to be a plane model-field of definition for C if L is a field of definition for C, i.e. ∃ a smooth curve C' defined over L where C'×Lk C, and such that C' is L-isomorphic to a non-singular plane model F(X,Y,Z)=0 in P2L. In this short note, we construct a smooth plane curve C over Q, such that the field of moduli of C is not a field of definition for C, and also fields of definition do not coincide with plane model-fields of definition for C. As far as we know, this is the first example in the literature with the above property, since this phenomenon does not occur for hyperelliptic curves, replacing plane model-fields of definition with the so-called hyperelliptic model-fields of definition.