The mod k chromatic index of graphs is O(k)
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Let $\chi'_k(G)$ denote the minimum number of colors needed to color the edges of a graph $G$ in a way that the subgraph spanned by the edges of each color has all degrees congruent to $1 \pmod k$. Scott [{\em Discrete Math. 175}, 1-3 (1997), 289--291] proved that $\chi'_k(G)\leq5k^2\log k$, and thus settled a question of Pyber [{\em Sets, graphs and numbers} (1992), pp. 583--610], who had asked whether $\chi_k'(G)$ can be bounded solely as a function of $k$. We prove that $\chi'_k(G)=O(k)$, answering affirmatively a question of Scott.
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