Counting algebraic points in expansions of o-minimal structures by a dense set

Abstract

The Pila-Wilkie theorem states that if a set X⊂eq Rn is definable in an o-minimal structure R and contains `many' rational points, then it contains an infinite semialgebraic set. In this paper, we extend this theorem to an expansion R= R, P of R by a dense set P, which is either an elementary substructure of R, or it is independent, as follows. If X is definable in R and contains many rational points, then it is dense in an infinite semialgebraic set. Moreover, it contains an infinite set which is -definable in R, P, where R is the real field.