Bi-Colored Expansions of Geometric Theories

Abstract

This paper concerns the study of Bi-colored expansions of geometric theories in the light of the Fra\"iss\'e-Hrushovski construction method. Substructures of models of a geometric theory T are expanded by a color predicate p, and the dimension function associated with the pre-geometry of the T-algebraic closure operator together with a real number 0<α≤slant 1 is used to define a pre-dimension function δα. The pair (Kα+,≤slantα) consisting of all such expansions with a hereditary positive pre-dimension along with the notion of substructure ≤slantα associated to δα is then used as a natural setting for the study of generic bi-colored expansions in the style of Fra\"iss\'e-Hrushovski construction. Imposing certain natural conditions on T, enables us to introduce a complete axiomatization Tα for the class of rich structures in this class. We will show that if T is a dependent theory (NIP) then so is Tα. We further prove that whenever α is rational the strong dependence transfers to Tα. We conclude by showing that if T defines a linear order and α is irrational then Tα is not strongly dependent.