Progress on the adjacent vertex distinguishing edge colouring conjecture
Abstract
A proper edge colouring of a graph is adjacent vertex distinguishing if no two adjacent vertices see the same set of colours. Using a clever application of the Local Lemma, Hatami (2005) proved that every graph with maximum degree and no isolated edge has an adjacent vertex distinguishing edge colouring with + 300 colours, provided is large enough. We show that this bound can be reduced to + 19. This is motivated by the conjecture of Zhang, Liu, and Wang (2002) that + 2 colours are enough for ≥ 3.
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