摘要
Let Tn be an arc-colored tournament of order n. The maximum monochromatic indegree Δ-mon(Tn) (resp. outdegree Δ+mon(Tn)) of Tn is the maximum number of in-arcs (resp. out-arcs) of a same color incident to a vertex of Tn. The irregularity i(Tn) of Tn is the maximum difference between the indegree and outdegree of a vertex of Tn. A subdigraph H of an arc-colored digraph D is called rainbow if each pair of arcs in H have distinct colors. In this paper, we show that each vertex v in an arc-colored tournament Tn with Δ-mon(Tn) ≤ Δ+mon(Tn) is contained in at least δ(v)(n-δ(v)-i(Tn))2-[Δ-mon(Tn)(n-1)+Δ+mon(Tn)d+(v)] rainbow triangles, where δ(v) = min { d+(v) , d-(v) }. We also give some maximum monochromatic degree conditions for Tn to contain rainbow triangles, and to contain rainbow triangles passing through a given vertex. Finally, we present some examples showing that some of the conditions in our results are best possible.
| 源语言 | 英语 |
|---|---|
| 页(从-至) | 1271-1290 |
| 页数 | 20 |
| 期刊 | Graphs and Combinatorics |
| 卷 | 37 |
| 期 | 4 |
| DOI | |
| 出版状态 | 已出版 - 7月 2021 |