The Geometry of Lk-Canonization I: Rosiness from Efficient Constructibility

Abstract

We demonstrate that for the k-variable theory T of a finite structure (satisfying certain amalgamation conditions), if finite models of T can be recovered from diagrams of finite subsets of model of T in a certain "efficient" way, then T is rosy -- in fact, a certain natural 0-categorical completion T of T is super-rosy of finite U-rank. In an appendix, we also show that any k-variable theory T of a finite structure for which the Strong Lk-Canonization Problem is efficient soluble has the necessary amalgamation properties up to taking an appropriate reduct.