Spanning Triangle-trees and Flows of Graphs
Abstract
In this paper we study the flow-property of graphs containing a spanning triangle-tree. Our main results provide a structure characterization of graphs with a spanning triangle-tree admitting a nowhere-zero -flow. All these graphs without nowhere-zero -flows are constructed from by a so-called bull-growing operation. This generalizes a result of Fan et al. in 2008 on triangularly-connected graphs and particularly shows that every -edge-connected graph with a spanning triangle-tree has a nowhere-zero -flow. A well-known classical theorem of Jaeger in 1979 shows that every graph with two edge-disjoint spanning trees admits a nowhere-zero -flow. We prove that every graph with two edge-disjoint spanning triangle-trees has a flow strictly less than .
Keywords
Cite
@article{arxiv.1910.05058,
title = {Spanning Triangle-trees and Flows of Graphs},
author = {Jiaao Li and Xueliang Li and Meiling Wang},
journal= {arXiv preprint arXiv:1910.05058},
year = {2019}
}
Comments
16 pages, 8 figures