In this paper we consider a property of claw-free graphs.We show that if d(u)+ d(v)≥ν(G)+2k+3,for every two nonadjacent vertices u and v,then G is 2k-vertex-deletable IM-extendable,whereν(G)=|V(G)|.And the bound is...In this paper we consider a property of claw-free graphs.We show that if d(u)+ d(v)≥ν(G)+2k+3,for every two nonadjacent vertices u and v,then G is 2k-vertex-deletable IM-extendable,whereν(G)=|V(G)|.And the bound is tight.展开更多
It is said that a graph G is independent-set-deletable factor-critical (in short, ID-factor-critical), if, for everyindependent-set I which has the same parity as |V(G)|, G - I has a perfect matching. A graph G ...It is said that a graph G is independent-set-deletable factor-critical (in short, ID-factor-critical), if, for everyindependent-set I which has the same parity as |V(G)|, G - I has a perfect matching. A graph G is strongly IM-extendable, if for every spanning supergraph H of G, every induced matching of H is included in a perfect matching of H. The κ-th power of G, denoted by G^κ, is the graph with vertex set V(G) in which two vertices are adjacent if and only if they have distance at most k in G. ID-factor-criticality and IM-extendability of power graphs are discussed in this article. The author shows that, if G is a connected graph, then G^3 and T(G) (the total graph of G) are ID-factor-critical, and G^4 (when |V(G)| is even) is strongly IM-extendable; if G is 2-connected, then D^2 is ID-factor-critical.展开更多
基金Supported by the National Natural Sciences Youth Foundation(10901144)
文摘In this paper we consider a property of claw-free graphs.We show that if d(u)+ d(v)≥ν(G)+2k+3,for every two nonadjacent vertices u and v,then G is 2k-vertex-deletable IM-extendable,whereν(G)=|V(G)|.And the bound is tight.
基金Project supported by NSFC(10371112)NSFHN (0411011200)SRF for ROCS,SEM
文摘It is said that a graph G is independent-set-deletable factor-critical (in short, ID-factor-critical), if, for everyindependent-set I which has the same parity as |V(G)|, G - I has a perfect matching. A graph G is strongly IM-extendable, if for every spanning supergraph H of G, every induced matching of H is included in a perfect matching of H. The κ-th power of G, denoted by G^κ, is the graph with vertex set V(G) in which two vertices are adjacent if and only if they have distance at most k in G. ID-factor-criticality and IM-extendability of power graphs are discussed in this article. The author shows that, if G is a connected graph, then G^3 and T(G) (the total graph of G) are ID-factor-critical, and G^4 (when |V(G)| is even) is strongly IM-extendable; if G is 2-connected, then D^2 is ID-factor-critical.
