We present a randomized distributed algorithm that computes a $Delta$-coloring in any non-complete graph with maximum degree $Delta geq 4$ in $O(log Delta) + 2^{O(sqrt{loglog n})}$ rounds, as well as a randomized algorithm that computes a $Delta$-coloring in $O((log log n)^2)$ rounds when $Delta in [3, O(1)]$. Both these algorithms improve on an $O(log^3 n/log Delta)$-round algorithm of Panconesi and Srinivasan~[STOC1993], which has remained the state of the art for the past 25 years. Moreover, the latter algorithm gets (exponentially) closer to an $Omega(loglog n)$ round lower bound of Brandt et al.~[STOC16].
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