M. Woźniak (1995)
Discussiones Mathematicae Graph Theory
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Let G be a simple graph of order n and size e(G). It is well known that if e(G) ≤ n-2, then there is an edge-disjoint placement of two copies of G into Kₙ. We prove that with the same condition on size of G we have actually (with few exceptions) a careful packing of G, that is an edge-disjoint placement of two copies of G into Kₙ∖Cₙ.
Janata, Marek, Loebl, Martin, Szabó, Jácint (2005)
The Electronic Journal of Combinatorics [electronic only]
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Gensane, Thierry (2009)
The Electronic Journal of Combinatorics [electronic only]
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Daouya Laïche, Isma Bouchemakh, Éric Sopena (2017)
Discussiones Mathematicae Graph Theory
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The packing chromatic number χρ(G) of a graph G is the smallest integer k such that its set of vertices V(G) can be partitioned into k disjoint subsets V1, . . . , Vk, in such a way that every two distinct vertices in Vi are at distance greater than i in G for every i, 1 ≤ i ≤ k. For a given integer p ≥ 1, the p-corona of a graph G is the graph obtained from G by adding p degree-one neighbors to every vertex of G. In this paper, we determine the packing chromatic number of p-coronae...
I. Sahul Hamid, S. Saravanakumar (2015)
Discussiones Mathematicae Graph Theory
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In a graph G = (V,E), a non-empty set S ⊆ V is said to be an open packing set if no two vertices of S have a common neighbour in G. An open packing set which is not a proper subset of any open packing set is called a maximal open packing set. The minimum and maximum cardinalities of a maximal open packing set are respectively called the lower open packing number and the open packing number and are denoted by ρoL and ρo. In this paper, we present some bounds on these parameters. ...
Martin Loebl, Svatopluk Poljak (1988)
Mathematica Slovaca
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Caro, Yair, Yuster, Raphael (1997)
The Electronic Journal of Combinatorics [electronic only]
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Monika Pilśniak, Mariusz Woźniak (2007)
Discussiones Mathematicae Graph Theory
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A 2-packing of a hypergraph 𝓗 is a permutation σ on V(𝓗) such that if an edge e belongs to 𝓔(𝓗), then σ (e) does not belong to 𝓔(𝓗). We prove that a hypergraph which does not contain neither empty edge ∅ nor complete edge V(𝓗) and has at most 1/2n edges is 2-packable. A 1-uniform hypergraph of order n with more than 1/2n edges shows that this result cannot be improved by increasing the size of 𝓗.
Kelmans, Alexander, Mubayi, Dhruv, Sudakov, Benny (2001)
The Electronic Journal of Combinatorics [electronic only]
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Dennis, David, Williams, G. Brock (2005)
International Journal of Mathematics and Mathematical Sciences
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Kuperberg, Greg (2000)
Geometry & Topology
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Fodor, Ferenc (2000)
Beiträge zur Algebra und Geometrie
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