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Deterministic Distributed Edge-Coloring with Fewer Colors

1 Pith paper cite this work. Polarity classification is still indexing.

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abstract

We present a deterministic distributed algorithm, in the LOCAL model, that computes a $(1+o(1))\Delta$-edge-coloring in polylogarithmic-time, so long as the maximum degree $\Delta=\tilde{\Omega}(\log n)$. For smaller $\Delta$, we give a polylogarithmic-time $3\Delta/2$-edge-coloring. These are the first deterministic algorithms to go below the natural barrier of $2\Delta-1$ colors, and they improve significantly on the recent polylogarithmic-time $(2\Delta-1)(1+o(1))$-edge-coloring of Ghaffari and Su [SODA'17] and the $(2\Delta-1)$-edge-coloring of Fischer, Ghaffari, and Kuhn [FOCS'17], positively answering the main open question of the latter. The key technical ingredient of our algorithm is a simple and novel gradual packing of judiciously chosen near-maximum matchings, each of which becomes one of the color classes.

fields

math.LO 1

years

2026 1

verdicts

UNVERDICTED 1

representative citing papers

Measurable matchings in unbalanced graphs

math.LO · 2026-06-10 · unverdicted · novelty 8.0 · 2 refs

In Borel unbalanced bipartite multigraphs there exists a Borel matching covering μ-almost every vertex in the higher-degree part for any Borel probability measure μ.

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  • Measurable matchings in unbalanced graphs math.LO · 2026-06-10 · unverdicted · none · ref 63 · 2 links · internal anchor

    In Borel unbalanced bipartite multigraphs there exists a Borel matching covering μ-almost every vertex in the higher-degree part for any Borel probability measure μ.