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JGT
2008
2008
List colorings with measurable sets
The measurable list chromatic number of a graph G is the smallest number such that if each vertex v of G is assigned a set L(v) of measure in a fixed atomless measure space, then there exist sets c(v) L(v) such that each c(v) has measure one and c(v)c(v ) = for every pair of adjacent vertices v and v . We show that the measurable list chromatic number of a finite graph G is equal to its fractional chromatic number. We also apply our method to obtain an alternative proof of a measurable generalization of Hall's theorem due to Hilton and Johnson [J. Graph Theory 54 (2007), 179
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| Added | 13 Dec 2010 |
| Updated | 13 Dec 2010 |
| Type | Journal |
| Year | 2008 |
| Where | JGT |
| Authors | Jan Hladký, Daniel Král, Jean-Sébastien Sereni, Michael Stiebitz |
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