An algebraic result on the topological closure of the set of rational points on a sphere whose center is non-rational, II

Abstract

Let S be a sphere in Rn such that Sn≠ and let Cl denote the closure operator in the Euclidean topology of Rn. If the center of S is in Qn, then Cl(Sn) is S, as is easily proved. If the center of S is not in Qn, then what is Cl(Sn)? This question, which was answered partially in the author's paper [Proc. Japan Acad. Ser. A Math. Sci. 80 (2004), no. 7, 146--149], is answered completely in this paper by representing Cl(Sn) in terms of the group of Q-automorphisms of the algebraic closure of Q(γ1,...,γn) in C, where γ1,...,γn denote the coordinates of the center of S.