Local And Global Colorability of Graphs
Abstract
It is shown that for any fixed c ≥ 3 and r, the maximum possible chromatic number of a graph on n vertices in which every subgraph of radius at most r is c colorable is (n 1r+1 ) (that is, n1r+1 up to a factor poly-logarithmic in n). The proof is based on a careful analysis of the local and global colorability of random graphs and implies, in particular, that a random n-vertex graph with the right edge probability has typically a chromatic number as above and yet most balls of radius r in it are 2-degenerate.
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