Fractional colorings with large denominators
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The m-chromatic number χm(G) of a graph G is the fewest colors needed so each node has m colors and no color appears on adjacent nodes. The fractional chromatic number is χ*(G)=limm∞χm(G)/m. Let m(G) be the least m so that χ* (G) = χm(G)/m. For n node graphs, Chvatal, Garey and Johnson showed m(G) ≦ nn/2 and gave example, where m(G) is asymptotically
. This note gives examples where m(G) is asymptotically λn, where λ ≈ 1.346193. © 1995 John Wiley & Sons, Inc.
[1] L. Lovász. Minimax theorems for hypergraphs , 1974 .
[2] David S. Johnson,et al. Two Results Concerning Multicoloring , 1978 .
[3] Michael Larsen,et al. The fractional chromatic number of mycielski's graphs , 1995, J. Graph Theory.
[4] S. Stahl. n-Tuple colorings and associated graphs , 1976 .
[5] Donald J. Newman,et al. A problem seminar , 1984 .
[6] Jan Mycielski. Sur le coloriage des graphs , 1955 .