On Group Choosability of Total Graphs

In this paper, we study the group and list group colorings of total graphs and present group coloring versions of the total and list total colorings conjectures. We establish the group coloring version of the total coloring conjecture for the following classes of graphs: graphs with small maximum degree, two-degenerate graphs, planner graphs with maximum degree at least 11, planner graphs without certain small cycles, outerplanar graphs and near outerplanar graphs with maximum degree at least 4. In addition, the group version of the list total coloring conjecture is established for forests, outerplanar graphs and graphs with maximum degree at most two.     

On Group Choosability of Graphs,II

Given a group A and a directed graph G, let F(G, A) denote the set of all maps ${f : E(G) \rightarrow A}$ . Fix an orientation of G and a list assignment ${L : V(G) \mapsto 2^A}$ . For an ${f \in F(G, A)}$ , G is (A, L, f)-colorable if there exists a map ${c:V(G) \mapsto \cup_{v \in V(G)}L(v)}$ such that ${c(v) \in L(v)}$ , ${\forall v \in V(G)}$ and ${c(x)-c(y)\neq f(xy)}$ for every edge e = xy directed from x to y. If for any ${f\in F(G,A)}$ , G has an (A, L, f)-coloring, then G is (A, L)-colorable. If G is (A, L)-colorable for any group A of order at least k and for any k-list assignment ${L:V(G) \rightarrow 2^A}$ , then G is k-group choosable. The group choice number, denoted by ${\chi_{gl}(G)}$ , is the minimum k such that G is k-group choosable. In this paper, we prove that every planar graph is 5-group choosable, and every planar graph with girth at least 5 is 3-group choosable. We also consider extensions of these results to graphs that do not have a K ₅ or a K _3,3 as a minor, and discuss group choosability versions of Hadwiger’s and Woodall’s conjectures.     

On Hamiltonicity of 3-Connected Claw-Free Graphs

Lai, Shao and Zhan (J Graph Theory 48:142–146, 2005) showed that every 3-connected N ₂-locally connected claw-free graph is Hamiltonian. In this paper, we generalize this result and show that every 3-connected claw-free graph G such that every locally disconnected vertex lies on some induced cycle of length at least 4 with at most 4 edges contained in some triangle of G is Hamiltonian. It is best possible in some sense.     

Clique-Coloring Claw-Free Graphs

A clique is defined as a complete subgraph maximal under inclusion and having at least two vertices. A k-clique-coloring of a graph G is an assignment of k colors to the vertices of G such that no clique of G is monochromatic. Bacsó et al. (SIAM J Discrete Math 17:361–376, 2004) noted that the clique-coloring number is unbounded even for the line graphs of complete graphs. In this paper, we prove that a claw-free graph with maximum degree at most 7, except an odd cycle longer than 3, has a 2-clique-coloring by using a decomposition theorem of Chudnovsky and Seymour (J Combin Theory Ser B 98:839–938, 2008) and the limitation of the degree 7 is necessary since the line graph of \(K_{6}\) is a graph with maximum degree 8 but its clique-coloring number is 3 by the Ramsey number \(R(3,3)=6\). In addition, we point out that, if an arbitrary line graph of maximum degree at most d is m-clique-colorable (\(m\ge 3\)), then an arbitrary claw-free graph of maximum degree at most d is also m-clique-colorable.     

On a Closure Concept in Claw-Free Graphs

IfGis a claw-free graph, then there is a graphcl(G) such that (i) Gis a spanning subgraph ofcl(G), (ii) cl(G) is a line graph of a triangle-free graph, and (iii) the length of a longest cycle inGand incl(G) is the same. A sufficient condition for hamiltonicity in claw-free graphs, the equivalence of some conjectures on hamiltonicity in 2-tough graphs and the hamiltonicity of 7-connected claw-free graphs are obtained as corollaries.     

Free Choosability of Outerplanar Graphs

A graph G is free (a, b)-choosable if for any vertex v with b colors assigned and for any list of colors of size a associated with each vertex \(u\ne v\), the coloring can be completed by choosing for u a subset of b colors such that adjacent vertices are colored with disjoint color sets. In this note, a necessary and sufficient condition for a cycle to be free (a, b)-choosable is given. As a corollary, we obtain almost optimal results about the free (a, b)-choosability of outerplanar graphs.     

Hamiltonian Connected Claw-Free Graphs

A well-known result by O. Ore is that every graph of order n with d(u)+d(v)n+1 for any pair of nonadjacent vertices u and v is hamiltonian connected (i.e., for every pair of vertices, there is a hamiltonian path joining them). In this paper, we show that every 3-connected claw-free graph G on at most 5–8 vertices is hamiltonian connected, where denotes the minimum degree in G. This result generalizes several previous results.Acknowledgments. The author would like to thank the referee for his important suggestions and careful corrections.Final version received: March 12, 2003Supported by the project of Nature Science Funds of China     

Paired-Domination in Claw-Free Graphs

A paired-dominating set of a graph G is a dominating set of vertices whose induced subgraph has a perfect matching, while the paired-domination number, denoted by γ _pr (G), is the minimum cardinality of a paired-dominating set in G. In this paper we investigate the paired-domination number in claw-free graphs. Specifically, we show that γ _pr (G) ≤ (3n ? 1)/5 if G is a connected claw-free graph of order n with minimum degree at least three and that this bound is sharp.     

Paired-Domination in Claw-Free Cubic Graphs

A set S of vertices in a graph G is a paired-dominating set of G if every vertex of G is adjacent to some vertex in S and if the subgraph induced by S contains a perfect matching. The minimum cardinality of a paired-dominating set of G is the paired-domination number of G, denoted by _pr(G). If G does not contain a graph F as an induced subgraph, then G is said to be F-free. In particular if F=K_1,3 or K₄–e, then we say that G is claw-free or diamond-free, respectively. Let G be a connected cubic graph of order n. We show that (i) if G is (K_1,3,K₄–e,C₄)-free, then _pr(G)3n/8; (ii) if G is claw-free and diamond-free, then _pr(G)2n/5; (iii) if G is claw-free, then _pr(G)n/2. In all three cases, the extremal graphs are characterized.Research supported in part by the South African National Research Foundation and the University of KwaZulu-Natal. This paper was written while the second author was visiting the Laboratoire de Recherche en Informatique (LRI) at the Université de Paris-Sud in July 2002. The second author thanks the LRI for their warm hospitality     

On Choosability with Separation of Planar Graphs with Forbidden Cycles

We study choosability with separation which is a constrained version of list coloring of graphs. A ‐list assignment L of a graph G is a function that assigns to each vertex v a list of at least k colors and for any adjacent pair , the lists and share at most d colors. A graph G is ‐choosable if there exists an L‐coloring of G for every ‐list assignment L. This concept is also known as choosability with separation. We prove that planar graphs without 4‐cycles are (3, 1)‐choosable and that planar graphs without 5‐ and 6‐cycles are (3, 1)‐choosable. In addition, we give an alternative and slightly stronger proof that triangle‐free planar graphs are (3, 1)‐choosable.     

Traceability in Small Claw-Free Graphs

We prove that a claw-free, 2-connected graph with fewer than 18 vertices is traceable, and we determine all non-traceable, claw-free, 2-connected graphs with exactly 18 vertices and a minimal number of edges. This complements a result of Matthews on Hamiltonian graphs.     

Hamiltonian Connectedness in Claw-Free Graphs

If every vertex cut of a graph G contains a locally 2-connected vertex, then G is quasilocally 2-connected. In this paper, we prove that every connected quasilocally 2-connected claw-free graph is Hamilton-connected.     

Acyclic Choosability of Graphs with Bounded Degree

An acyclic colouring of a graph G is a proper vertex colouring such that every cycle uses at least three colours. For a list assignment L = {L(v)| v∈V(G)}, if there exists an acyclic colouringρ such that ρ(v)∈L(v) for each v∈V(G), then ρ is called an acyclic L-list colouring of G. If there exists an acyclic L-list colouring of G for any L with |L(v)|≥k for each v∈V(G), then G is called acyclically k-choosable. In this paper, we prove that every graph with maximum degree Δ≤7 is acyclically 13-cho...     

关于完美全图的Hamilton－性

设Ｇ（Ｖ，Ｅ）是一个简单图，而Ｖ（Ｔ（Ｇ））＝Ｖ（Ｇ）∪Ｅ（Ｇ），Ｂ（Ｔ（Ｇ））＝｛ｙｚ｜ｙ，ｚ相邻或相关，ｙ，ｚ∈Ｖ（Ｇ）∪Ｅ（Ｇ）｝．则称Ｔ（Ｇ）为Ｇ（Ｖ，Ｅ）的全图；若对Ｇ的每一导出子图Ｈ，有ｘ（Ｈ）＝ω（Ｈ）；则称Ｇ是完美的．其中ｘ（Ｈ），ω（Ｈ）分别表示Ｈ的色数和团数．本文给出了完美全图是Ｈａｍｉｌｔｏｎ图的充分必要条件．     

Longest Cycles in Almost Claw-Free Graphs

Some known results on claw-free graphs are generalized to the larger class of almost claw-free graphs. In this paper, we prove several properties on longest cycles in almost claw-free graphs. In particular, we show the following two results.? (1) Every 2-connected almost claw-free graph on n vertices contains a cycle of length at least min {n, 2δ+4} and the bound 2δ+ 4 is best possible, thereby fully generalizing a result of Matthews and Sumner.? (2) Every 3-connected almost claw-free graph on n vertices contains a cycle of length at least min {n, 4δ}, thereby fully generalizing a result of MingChu Li. Received: September 17, 1996 Revised: September 22, 1998     

Hamiltonian Cycles in Almost Claw-Free Graphs

 Some known results on claw-free graphs are generalized to the larger class of almost claw-free graphs. In this paper, we prove the following two results and conjecture that every 5-connected almost claw-free graph is hamiltonian. (1). Every 2-connected almost claw-free graph G∉J on n≤ 4 δ vertices is hamiltonian, where J is the set of all graphs defined as follows: any graph G in J can be decomposed into three disjoint connected subgraphs G ₁, G ₂ and G ₃ such that E _G (G _i , G _j ) = {u _i , u _j , v _i v _j } for i≠j and i,j = 1, 2, 3 (where u _i ≠v _i ∈V(G _i ) for i = 1, 2, 3). Moreover the bound 4δ is best possible, thereby fully generalizing several previous results. (2). Every 3-connected almost claw-free graph on at most 5δ−5 vertices is hamiltonian, hereby fully generalizing the corresponding result on claw-free graphs. Received: September 21, 1998 Final version received: August 18, 1999