Characterizing decidability in a quasianalytic setting

Abstract

Let S denote the expansion of the real ordered field by a family of real-valued functions S, where each function in S is defined on a compact box and is a member of some quasianalytic class which is closed under the operations of function composition, division by variables, and implicitly defined functions. It is shown that the first order theory of S is decidable if and only if two oracles, called the approximation and precision oracles for S, are decidable. Loosely stated, the approximation oracle for S allows one to approximate any partial derivative of any function in S to within any given error, and the precision oracle for S allows one to decide when a manifold M⊂eqn is contained in a coordinate hyperplane \x∈n : xi = 0\ when one is given i∈\1,…,n\ and a system of equations which defines M nonsingularly, where the functions occurring in the equations are rational polynomials of the coordinate variables x = (x1,…,xn) and the partial derivatives of the functions in S. A key component of the proof is the development of a local resolution of singularities procedure which is effective in the approximation and precision oracles for , and in the course of proving our main theorem, numerous theorems about the model theory of such structures S are also proven.