Colouring powers and girth
classification
🧮 math.CO
keywords
boundsgirthlowerproblemupperalonblocksbuilding
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Alon and Mohar (2002) posed the following problem: among all graphs $G$ of maximum degree at most $d$ and girth at least $g$, what is the largest possible value of $\chi(G^t)$, the chromatic number of the $t$th power of $G$? For $t\ge 3$, we provide several upper and lower bounds concerning this problem, all of which are sharp up to a constant factor as $d\to \infty$. The upper bounds rely in part on the probabilistic method, while the lower bounds are various direct constructions whose building blocks are incidence structures.
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Coloring, List Coloring, and Painting Squares of Graphs (and other related problems)
This is a survey compiling results on strong edge-coloring and related coloring problems for squares of graphs in planar and sparse classes.
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