Every plane graph of maximum degree 8 has an edge-face 9-colouring
Abstract
An edge-face colouring of a plane graph with edge set E and face set F is a colouring of the elements of E F such that adjacent or incident elements receive different colours. Borodin proved that every plane graph of maximum degree 10 can be edge-face coloured with +1 colours. Borodin's bound was recently extended to the case where =9. In this paper, we extend it to the case =8.
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