Triangulations of monotone families I: Two-dimensional families

Abstract

Let K ⊂ Rn be a compact definable set in an o-minimal structure over R, e.g., a semi-algebraic or a subanalytic set. A definable family \ Sδ|\> 0< δ ∈ R \ of compact subsets of K, is called a monotone family if Sδ ⊂ Sη for all sufficiently small δ > η >0. The main result of the paper is that when K 2 there exists a definable triangulation of K such that for each (open) simplex of the triangulation and each small enough δ>0, the intersection Sδ is equivalent to one of the five standard families in the standard simplex (the equivalence relation and a standard family will be formally defined). The set of standard families is in a natural bijective correspondence with the set of all five lex-monotone Boolean functions in two variables. As a consequence, we prove the two-dimensional case of the topological conjecture in [6] on approximation of definable sets by compact families. We introduce most technical tools and prove statements for compact sets K of arbitrary dimensions, with the view towards extending the main result and proving the topological conjecture in the general case.