On Choosability with Separation of Planar Graphs with Forbidden Cycles
We study choosability with separation which is a constrained version of list coloring of graphs. A (k, d)-list assignment L of a graph G is a function that assigns to each vertex v a list L(v) of at least k colors and for any adjacent pair xy, the lists L(x) and L(y) share at most d colors. A graph G is (k, d)-choosable if there exists an L-coloring of G for every (k, d)-list assignment L. This concept is also known as choosability with separation. We prove that planar graphs without 4-cycles are (3, 1)-choosable and that planar graphs without 5- and 6-cycles are (3, 1)-choosable. In addition, we give an alternative and slightly stronger proof that triangle-free planar graphs are (3, 1)-choosable. (C) 2015 Wiley Periodicals, Inc
- Publisher
- WILEY-BLACKWELL
- Issue Date
- 2016-03
- Language
- English
- Article Type
- Article
- Keywords
COLORINGS
- Citation
JOURNAL OF GRAPH THEORY, v.81, no.3, pp.283 - 306
- ISSN
- 0364-9024
- Appears in Collection
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