An effective descent of arithmetical real algebraic varieties

Abstract

Let X be a complex smooth algebraic variety admitting a symmetry L, that is, an antiholomorphic automorphism of order two. If both, X and L are defined over Q, then Koeck, Lau and Singerman showed the existence of a complex smooth algebraic variety Z admitting a symmetry T, both defined over R Q, and of an isomorphism R:X Z so that R L R-1=T. The provided proof is existential and, if explicit equations for X and L are given over Q, then it is not described how to get the explicit equations for Z and T over R Q. In this paper we provide an explicit rational map R defined over Q so that Z=R(X) is defined over R Q and with T=R L R-1 being the usual conjugation map.