2017
DOI: 10.1016/j.jctb.2017.06.001
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Breaking graph symmetries by edge colourings

Abstract: The distinguishing index D ′ (G) of a graph G is the least number of colours needed in an edge colouring which is not preserved by any non-trivial automorphism. Broere and Pilśniak conjectured that if every non-trivial automorphism of a countable graph G moves infinitely many edges, then D ′ (G) ≤ 2. We prove this conjecture.

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Cited by 20 publications
(15 citation statements)
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“…Partial results were obtained in . Let us mentioned that the Infinite Edge‐Motion Conjecture by Broere and Pilśniak was proved by Lehner in , thus confirming the Infinite Motion Conjecture for line graphs.…”
Section: Introductionmentioning
confidence: 65%
“…Partial results were obtained in . Let us mentioned that the Infinite Edge‐Motion Conjecture by Broere and Pilśniak was proved by Lehner in , thus confirming the Infinite Motion Conjecture for line graphs.…”
Section: Introductionmentioning
confidence: 65%
“…They proved that for every connected infinite graph we have D (G) ∆, where ∆ is a cardinal number such that degree of any vertex is at most ∆. They also stated an infinite edge-motion conjecture (analogous to the Infinite Motion Conjecture of Tucker) that was very recently confirmed by Lehner [10]. Kalinowski and Pilśniak [7] also compared D(G) and D (G) when G is a finite graph.…”
Section: Introductionmentioning
confidence: 96%
“…Generally D (G) can be arbitrary smaller than D(G), for instance if p ≥ 6, then D (K p ) = 2 and D(K p ) = p. Conversely, there is an upper bound on D (G) in terms of D(G). In [12,Theorem 11] (see also [17,Theorem 8] for an alternative proof) it is proved that if G is a connected graph of order at least 3, then…”
Section: Introductionmentioning
confidence: 99%