Given a graph $G$ and an integer $k\geq 2$, let $χ'_k(G)$ denote the minimum number of colours required to colour the edges of $G$ such that, in each colour class, the subgraph induced by the edges of that colour has all non-zero degrees congruent to $1$ modulo $k$. In 1992, Pyber proved that $χ'_2(G) \leq 4$ for every graph $G$, and posed the question of whether $χ'_k(G)$ can be bounded solely in terms of $k$ for every $k\geq 3$. This question was answered in 1997 by Scott, who showed that $χ'_k(G)\leq5k^2\log k$, and further asked whether $χ'_k(G) = O(k)$. Recently, Botler, Colucci, and Kohayakawa (2023) answered Scott's question affirmatively proving that $χ'_k(G) \leq 198k - 101$, and conjectured that the multiplicative constant could be reduced to $1$. A step towards this latter conjecture was made in 2024 by Nweit and Yang, who improved the bound to $χ'_k(G) \leq 177k - 93$. In this paper, we further improve the multiplicative constant to $9$. More specifically, we prove that there is a function $f\in o(k)$ for which $χ'_k(G) \leq 7k + f(k)$ if $k$ is odd, and $χ'_k(G) \leq 9k + f(k)$ if $k$ is even. In doing so, we prove that $χ'_k(G) \leq k + O(d)$ for every $d$-degenerate graph $G$, which plays a central role in our proof.
翻译:给定一个图$G$和一个整数$k\\geq 2$,记$\\chi'_k(G)$为对$G$的边进行着色所需的最小颜色数,要求每种颜色类中,由该颜色边导出的子图的所有非零度数均模$k$余$1$。1992年,Pyber证明了对于任意图$G$有$\\chi'_2(G) \\leq 4$,并提出疑问:对于所有$k\\geq 3$,$\\chi'_k(G)$是否仅依赖于$k$有界?1997年,Scott回答了该问题,证明了$\\chi'_k(G)\\leq5k^2\\log k$,并进一步追问$\\chi'_k(G) = O(k)$是否成立。近期,Botler、Colucci与Kohayakawa(2023)肯定地回答了Scott的问题,证明了$\\chi'_k(G) \\leq 198k - 101$,并猜想其乘性常数可降至$1$。2024年,Nweit与Yang朝此猜想迈进了一步,将界改进为$\\chi'_k(G) \\leq 177k - 93$。本文中,我们进一步将乘性常数改进至$9$。具体而言,我们证明存在函数$f\\in o(k)$,使得当$k$为奇数时$\\chi'_k(G) \\leq 7k + f(k)$,当$k$为偶数时$\\chi'_k(G) \\leq 9k + f(k)$。在此过程中,我们证明了对于任意$d$-退化图$G$有$\\chi'_k(G) \\leq k + O(d)$,这一结论在我们的证明中起着核心作用。
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