Supereulerian 2-edge-coloured graphs
Abstract
A 2-edge-coloured graph is {\bf supereulerian} if contains a spanning closed trail in which the edges alternate in colours. An {\bf eulerian factor} of a 2-edge-coloured graph is a collection of vertex disjoint induced subgraphs which cover all the vertices of such that each of these subgraphs is supereulerian. We give a polynomial algorithm to test if a 2-edge-coloured graph has an eulerian factor and to produce one when it exists. A 2-edge-coloured graph is {\bf (trail-)colour-connected} if it contains a pair of alternating -paths (-trails) whose union is an alternating closed walk for every pair of distinct vertices . A 2-edge-coloured graph is {\bf M-closed} if is an edge of whenever some vertex is joined to both and by edges of the same colour. M-closed 2-edge-coloured graphs, introduced in \cite{balbuenaDMTCS21}, form a rich generalization of 2-edge-coloured complete graphs. We show that if is an extension of an M-closed 2-edge-coloured complete graph, then is supereulerian if and only if is trail-colour-connected and has an eulerian factor. We also show that for general 2-edge-coloured graphs it is NP-complete to decide whether the graph is supereulerian. Finally we pose a number of open problems.
Cite
@article{arxiv.2004.01955,
title = {Supereulerian 2-edge-coloured graphs},
author = {Jørgen Bang-Jensen and Thomas Bellitto and Anders Yeo},
journal= {arXiv preprint arXiv:2004.01955},
year = {2020}
}