Independence and Induction in Reverse Mathematics
Abstract
We continue the project of the study of reverse mathematics principles inspired by cardinal invariants. In this article in particular we focus on principles encapsulating the existence of large families of objects that are in some sense mutually independent. More precisely, we study the principle stating that a maximal family of pairwise almost disjoint sets exists; and the principle expressing the existence of a maximal family of functions that are pairwise eventually different. We investigate characterisations of and relations between these principles and some of their variants. It turns out that induction strength at the levels of or is an essential parameter; for instance, over , we show that is equivalent to the principle expressing that every weakly represented family of functions is dominated by some other function.
Keywords
Cite
@article{arxiv.2408.09796,
title = {Independence and Induction in Reverse Mathematics},
author = {David Belanger and Chi Tat Chong and Rupert Hölzl and Frank Stephan},
journal= {arXiv preprint arXiv:2408.09796},
year = {2026}
}