Piecewise convex embeddability on linear orders
Abstract
Given a nonempty set of linear orders, we say that the linear order is -convex embeddable into the linear order if it is possible to partition into convex sets indexed by some element of which are isomorphic to convex subsets of ordered in the same way. This notion generalizes convex embeddability and (finite) piecewise convex embeddability (both studied in arXiv:2309.09910), which are the special cases and . We focus mainly on the behavior of these relations on the set of countable linear orders, first characterizing when they are transitive, and hence a quasi-order. We then study these quasi-orders from a combinatorial point of view, and analyze their complexity with respect to Borel reducibility. Finally, we extend our analysis to uncountable linear orders.
Cite
@article{arxiv.2312.01198,
title = {Piecewise convex embeddability on linear orders},
author = {Martina Iannella and Alberto Marcone and Luca Motto Ros and Vadim Weinstein},
journal= {arXiv preprint arXiv:2312.01198},
year = {2025}
}
Comments
34 pages