English

Path Odd-Covers of Graphs

Combinatorics 2023-06-13 v1

Abstract

We introduce and study "path odd-covers", a weakening of Gallai's path decomposition problem and a strengthening of the linear arboricity problem. The "path odd-cover number" p2(G)p_2(G) of a graph GG is the minimum cardinality of a collection of paths whose vertex sets are contained in V(G)V(G) and whose symmetric difference of edge sets is E(G)E(G). We prove an upper bound on p2(G)p_2(G) in terms of the maximum degree Δ\Delta and the number of odd-degree vertices voddv_{\text{odd}} of the form max{vodd/2,2Δ/2}\max\left\{{v_{\text{odd}}}/{2}, 2\left\lceil {\Delta}/{2}\right \rceil\right\}. This bound is only a factor of 22 from a rather immediate lower bound of the form max{vodd/2,Δ/2}\max \left\{ {v_{\text{odd}} }/{2} , \left\lceil {\Delta}/{2}\right\rceil \right\}. We also investigate some natural relaxations of the problem which highlight the connection between the path odd-cover number and other well-known graph parameters. For example, when allowing for subdivisions of GG, the previously mentioned lower bound is always tight except in some trivial cases. Further, a relaxation that allows for the addition of isolated vertices to GG leads to a match with the linear arboricity when GG is Eulerian. Finally, we transfer our observations to establish analogous results for cycle odd-covers.

Keywords

Cite

@article{arxiv.2306.06487,
  title  = {Path Odd-Covers of Graphs},
  author = {Steffen Borgwardt and Calum Buchanan and Eric Culver and Bryce Frederickson and Puck Rombach and Youngho Yoo},
  journal= {arXiv preprint arXiv:2306.06487},
  year   = {2023}
}
R2 v1 2026-06-28T11:02:00.335Z