On order-compatible paths in infinite graphs
Abstract
Two paths in a graph are order-compatible if their common vertices occur in the same order when travelling from to . Suppose a graph contains an infinite number of edge-disjoint paths. G.A. Dirac asked whether there always exists a family of edge-disjoint paths that are pairwise order-compatible. Confirming a conjecture by B. Zelinka, we show that this holds provided that the given edge-disjoint paths have bounded length. Combining this with an earlier work of Zelinka, it follows that Dirac's question for an infinite cardinal has an affirmative answer if and only if has uncountable cofinality. As our second main result, we show that even when Dirac's question fails, it still holds that 'being connected by edge-disjoint, pairwise order-compatible paths' is an equivalence relation for all values of . The most interesting case here is when is countable.
Keywords
Cite
@article{arxiv.2603.08454,
title = {On order-compatible paths in infinite graphs},
author = {Max Pitz and Lucas Real and Roman Schaut},
journal= {arXiv preprint arXiv:2603.08454},
year = {2026}
}
Comments
11 pages, 2 figures