sp-Homogeneous Linear Orderings
Abstract
We study linear orderings expanded by functions for successor and predecessor. The successor and predecessor on linear orderings capture the relatively intrinsically computably enumerable information about orderings in much the same way that dependence captures that for vector spaces. In particular, the sp-homogeneous and weakly sp-homogeneous linear orderings are those which are (ultra-)homogeneous or weakly homogeneous with this additional structure. We demonstrate that these orderings are always relatively categorical and determine exactly which ones are (uniformly) relatively categorical. We also provide a classification for sp-homogeneity and weak sp-homogeneity. We establish that this is the best possible classification by showing that the set of sp-homogeneous linear orderings is complete, and that the set of weakly sp-homogeneous linear orderings is complete. These results are obtained in two different ways, one using a hands-on computability theoretic approach and another using more abstract descriptive set theory.
Cite
@article{arxiv.2509.25005,
title = {sp-Homogeneous Linear Orderings},
author = {Wesley Calvert and Douglas Cenzer and David Gonzalez and Valentina Harizanov and Keng Meng Ng},
journal= {arXiv preprint arXiv:2509.25005},
year = {2026}
}
Comments
34 pages