Some methods for constructing some classes of graceful uniform trees

Indonesian Journal of Combinatorics Pub Date : 2018-12-21 DOI:10.19184/ijc.2018.2.2.7

I. N. Suparta, I. D. M. A. Ariawan

引用次数: 3

Abstract

A tree T(V, E) is graceful if there exists an injective function f from the vertex set V(T) into the set {0, 1, 2, ..., ∣V∣ − 1} which induces a bijective function fʹ from the edge set E(T) onto the set {1, 2, ..., ∣E∣}, with fʹ(uv) = ∣f(u) − f(v)∣ for every edge {u, v} ∈ E. Motivated by the conjecture of Alexander Rosa (see) saying that all trees are graceful, a lot of works have addressed gracefulness of some trees. In this paper we show that some uniform trees are graceful. This results will extend the list of graceful trees.

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构造一类优美一致树的几种方法

如果存在从顶点集V(T)到集合{0,1,2，…的单射函数f，那么树T(V, E)是优美的，∣V∣−1}，它从边缘集E(T)导出一个双射函数f′到集合{1,2，…∣E∣},fʹ(紫外线)=∣(u)−f (v)为每条边∣{u, v}∈E。由于亚历山大·罗莎(Alexander Rosa)的猜想，所有的树都是优雅的，许多作品都解决了一些树的优雅问题。本文证明了一些均匀树是优美的。这个结果将扩展优雅树的列表。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Indonesian Journal of Combinatorics

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