Almost o-minimal structures and X-structures

Abstract

We propose new structures called almost o-minimal structures and X-structures. The former is a first-order expansion of a dense linear order without endpoints such that the intersection of a definable set with a bounded open interval is a finite union of points and open intervals. The latter is a variant of van den Dries and Miller's analytic geometric categories and Shiota's X-sets and Y-sets. In them, the family of definable sets are closed only under proper projections unlike first-order structures. We demonstrate that an X-expansion of an ordered divisible abelian group always contains an o-minimal expansion of an ordered group such that all bounded X-definable sets are definable in the structure. Another contribution of this paper is a uniform local definable cell decomposition theorem for almost o-minimal expansions of ordered groups M=(M,<,0,+,…). Let \Aλ\λ∈ be a finite family of definable subsets of Mm+n. Take an arbitrary positive element R ∈ M and set B=]-R,R[n. Then, there exists a finite partition into definable sets equation* Mm × B = X1 … Xk equation* such that B=(X1)b … (Xk)b is a definable cell decomposition of B for any b ∈ Mm and either Xi Aλ = or Xi ⊂eq Aλ for any 1 ≤ i ≤ k and λ ∈ . Here, the notation Sb denotes the fiber of a definable subset S of Mm+n at b ∈ Mm. We introduce the notion of multi-cells and demonstrate that any definable set is a finite union of multi-cells in the course of the proof of the above theorem.