Uniquely $D$-colourable digraphs with large girth II: simplification via generalization
Abstract
We prove that for every digraph and every choice of positive integers , there exists a digraph with girth at least together with a surjective acyclic homomorphism such that: (i) for every digraph of order at most , there exists an acyclic homomorphism if and only if there exists an acyclic homomorphism ; and (ii) for every -pointed digraph of order at most and every acyclic homomorphism there exists a unique acyclic homomorphism such that . This implies the main results in [A. Harutyunyan et al., Uniquely -colourable digraphs with large girth, Canad. J. Math., 64(6) (2012), 1310-1328; MR2994666] analogously with how the work [J. Ne\v{s}et\v{r}il and X. Zhu, On sparse graphs with given colorings and homomorphisms, J. Combin. Theory Ser. B, 90(1) (2004), 161-172; MR2041324] generalizes and extends [X. Zhu, Uniquely -colorable graphs with large girth, J. Graph Theory, 23(1) (1996), 33-41; MR1402136].
Cite
@article{arxiv.2007.01981,
title = {Uniquely $D$-colourable digraphs with large girth II: simplification via generalization},
author = {P. Mark Kayll and Esmaeil Parsa},
journal= {arXiv preprint arXiv:2007.01981},
year = {2021}
}
Comments
15 pages, 0 figures, minor revisions to address referee comments, revision in Section 4 (Case II) to expand and clarify proof, to appear in Electronic Journal of Combinatorics