On Neighbor-Distinguishing Index of Planar Graphs

Horňák, Mirko; Huang, Danjun; Wang, Weifan

doi:10.1002/jgt.21764

Cited by 37 publications

(23 citation statements)

References 10 publications

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“… for bipartite graphs and for graphs of maximum degree 3, while Greenhill and Ruciński proved it for almost all 4‐regular graphs (asymptotically almost surely), see . Recently it was also verified for planar graphs of maximum degree

Δ \geq 12

by means of the discharging method. Independently, Bonamy et al.…”

Section: Introductionmentioning

confidence: 94%

On the Neighbor Sum Distinguishing Index of Planar Graphs

Bonamy¹,

Przybyło

2016

J. Graph Theory

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Let c be a proper edge coloring of a graph G=(V,E) with integers 1,2,…,k. Then k≥Δ(G), while Vizing's theorem guarantees that we can take k≤Δ(G)+1. On the course of investigating irregularities in graphs, it has been conjectured that with only slightly larger k, that is, k=Δ(G)+2, we could enforce an additional strong feature of c, namely that it attributes distinct sums of incident colors to adjacent vertices in G if only this graph has no isolated edges and is not isomorphic to C5. We prove the conjecture is valid for planar graphs of sufficiently large maximum degree. In fact an even stronger statement holds, as the necessary number of colors stemming from the result of Vizing is proved to be sufficient for this family of graphs. Specifically, our main result states that every planar graph G of maximum degree at least 28, which contains no isolated edges admits a proper edge coloring c:E→{1,2,…,Δ(G)+1} such that ∑e∋ucfalse(efalse)≠∑e∋vcfalse(efalse) for every edge uv of G.

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Δ \geq 12

by means of the discharging method. Independently, Bonamy et al.…”

Section: Introductionmentioning

confidence: 94%

On the Neighbor Sum Distinguishing Index of Planar Graphs

Bonamy¹,

Przybyło

2016

J. Graph Theory

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“…Recently Hornák et al [10] confirmed this conjecture for planar graphs with maximum degree at least 12. Balister et al [2] proved Conjecture 1.1 for graphs with ∆(G) = 3 and for bipartite graphs.…”

Section: Introductionmentioning

confidence: 54%

Neighbor sum distinguishing edge colorings of sparse graphs

Chen

Luo

et al. 2015

Discrete Applied Mathematics

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“…It was conjectured [27] that ′ a (G) ≤ Δ(G) + 2 for every connected graph G of order at least three different from the cycle C 5 . This was, for example, positively verified by Balister, Györi, Lehel, and Schelp [4] for bipartite graphs and for graphs of maximum degree 3, while Greenhill and Ruciński proved it asymptotically almost surely for random 4-regular graphs, see [10], and [12,13,25] for results concerning other particular graph classes. In general it is known that ′ a (G) ≤ 3Δ(G), [2], and ′ a (G) ≤ Δ(G) + O(log (G)), [4], for every graph G with no isolated edges.…”

Section: Introductionmentioning

confidence: 75%

Asymptotically optimal bound on the adjacent vertex distinguishing edge choice number

Kwaśny

Przybyło

2018

Random Struct Algorithms

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An adjacent vertex distinguishing edge coloring of a graph G without isolated edges is its proper edge coloring such that no pair of adjacent vertices meets the same set of colors in G. We show that such coloring can be chosen from any set of lists associated to the edges of G as long as the size of every list is at least normalΔ+CΔ12false(normallognormalΔfalse)4, where Δ is the maximum degree of G and C is a constant. The proof is probabilistic. The same is true in the environment of total colorings.

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On Neighbor-Distinguishing Index of Planar Graphs

Cited by 37 publications

References 10 publications

On the Neighbor Sum Distinguishing Index of Planar Graphs

On the Neighbor Sum Distinguishing Index of Planar Graphs

Neighbor sum distinguishing edge colorings of sparse graphs

Asymptotically optimal bound on the adjacent vertex distinguishing edge choice number

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