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On coloring numbers of graph powers

The weak $r$-coloring numbers $wcol_r(G)$ of a graph $G$ were introduced by the first two authors as a generalization of the usual coloring number $col(G)$, and have since found interesting theoretical and algorithmic applications. This has motivated researchers to establish strong bounds on these parameters for various classes of graphs. Let $G^p$ denote the $p$-th power of $G$. We show that, all integers $p >0$ and $Δ\ge 3$ and graphs $G$ with $Δ(G) \leq Δ$ satisfy $col(G^p) \in O(p \cdot wcol_{\lceil p/2\rceil}(G)(Δ-1)^{\lfloor p/2\rfloor})$; for fixed tree width or fixed genus the ratio between this upper bound and worst case lower bounds is polynomial in $p$. For the square of graphs $G$, we also show that, if the maximum average degree $2k-2 < mad(G) \leq 2k$, then $ col(G^2) \leq (2k-1)Δ(G)+2k+1$.