The list distinguishing number equals the distinguishing number for interval graphs

Immel, Poppy; Wenger, Paul S.

doi:10.7151/dmgt.1927

Cited by 6 publications

(5 citation statements)

References 20 publications

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“…The introduction of the distinguishing number in 1996 by Albertson and Collins [1] was a great success; by now about one hundred papers were written motivated by this seminal paper! The core of the research has been done on the invariant D itself, either on finite [6,11,14] or infinite graphs [9,16,18]; see also the references therein. Extensions to group theory (cf.…”

Section: Introductionmentioning

confidence: 99%

Trees with distinguishing index equal distinguishing number plus one

Alikhani

Klavžar

Lehner

et al. 2020

Discuss. Math. Graph Theory

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Section: Introductionmentioning

confidence: 99%

Trees with distinguishing index equal distinguishing number plus one

Alikhani

Klavžar

Lehner

et al. 2020

Discuss. Math. Graph Theory

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show abstract

“…The introduction of the distinguishing number was a great success; by now about one hundred papers were written motivated by this seminal paper! The core of the research has been done on the invariant D itself, either on finite [6,9,11] or infinite graphs [7,12,13]; see also the references therein.…”

Section: Introductionmentioning

confidence: 99%

The cost number and the determining number of a graph

Alikhani,

Soltani

2017

Preprint

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The distinguishing number D(G) of a graph G is the least integer d such that G has an vertex labeling with d labels that is preserved only by a trivial automorphism. The minimum size of a label class in such a labeling of G with D(G) = d is called the cost of d-distinguishing G and is denoted by ρ d (G). A set of vertices S ⊆ V (G) is a determining set for G if every automorphism of G is uniquely determined by its action on S. The determining number of G, Det(G), is the minimum cardinality of determining sets of G. In this paper we obtain some general upper and lower bounds for ρ d (G) based on Det(G). Finally, we compute the cost and the determining number for the friendship graphs and corona product of two graphs.

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“…The introduction of the distinguishing number was a great success; by now about one hundred papers were written motivated by this seminal paper! The core of the research has been done on the invariant D itself, either on finite [3,11,12] or infinite graphs [7,13,14]; see also the references therein.…”

Section: Introductionmentioning

confidence: 99%

Characterization of graphs with distinguishing number equal list distinguishing number

Alikhani¹,

Soltani²

2017

Preprint

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The distinguishing number D(G) of a graph G is the least integer d such that G has an vertex labeling with d labels that is preserved only by a trivial automorphism. A list assignment to G is an assignment L = {L(v)} v∈V (G) of lists of labels to the vertices of G. A distinguishing L-labeling of G is a distinguishing labeling of G where the label of each vertex v comes from L(v). The list distinguishing number of G, D l (G) is the minimum k such that every list assignment to G in which |L(v)| = k for all v ∈ V (G) yields a distinguishing L-labeling of G. In this paper, we determine the list-distinguishing number for two families of graphs. We also characterize graphs with the distinguishing number equal the list distinguishing number. Finally, we show that this characterization works for other list numbers of a graph.

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The list distinguishing number equals the distinguishing number for interval graphs

Cited by 6 publications

References 20 publications

Trees with distinguishing index equal distinguishing number plus one

Trees with distinguishing index equal distinguishing number plus one

The cost number and the determining number of a graph

Characterization of graphs with distinguishing number equal list distinguishing number

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