Parametric geometry of numbers over a number field and extension of scalars

Abstract

The parametric geometry of numbers of Schmidt and Summerer deals with rational approximation to points in Rn. We extend this theory to a number field K and its completion Kw at a place w in order to treat approximation over K to points in Kwn. As a consequence, we find that exponents of approximation over Q in Rn have the same spectrum as their generalizations over K in Kwn. When w has relative degree one over a place of Q, we further relate approximation over K to a point in Kwn, to approximation over Q to a point in Qnd, obtained by extension of scalars, where d is the degree of K over Q. By combination with a result of Bel, this allows us to construct algebraic curves in R3d defined over Q, of degree 2d, containing points that are very singular with respect to rational approximation.