Abstract
Several basic theorems about the chromatic number of graphs can be extended to results in which, in addition to the existence of a κ-coloring, it is also shown that all κ-colorings of the graph in question are Kempe equivalent. Here, it is also proved that for a planar graph with chromatic number less than κ, all κ-colorings are Kempe equivalent.
Supported in part by the Ministry for Higher Education, Science and Technology of Slovenia, Research Program P1-0297.
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© 2006 Birkhäuser Verlag Basel/Switzerland
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Mohar, B. (2006). Kempe Equivalence of Colorings. In: Bondy, A., Fonlupt, J., Fouquet, JL., Fournier, JC., Ramírez Alfonsín, J.L. (eds) Graph Theory in Paris. Trends in Mathematics. Birkhäuser Basel. https://doi.org/10.1007/978-3-7643-7400-6_22
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