Powers are easy to avoid

Abstract

Suppose that R is an o-minimal expansion of the real field in which restricted power functions are definable. We show that if R is both a reduct (in the sense of definability) of the expansion R R of R by all real power functions and an expansion (again in the sense of definability) of R, then, provided that R and R have the same field of exponents, they define the same sets. This can be viewed as a polynomially bounded version of an old conjecture of van den Dries and Miller.