Let G = (V, E) be a connected graph. X belong to V(G) is a vertex set. X is a 3-restricted cut of G, if G- X is not connected and every component of G- X has at least three vertices. The 3-restricted connectivity ...Let G = (V, E) be a connected graph. X belong to V(G) is a vertex set. X is a 3-restricted cut of G, if G- X is not connected and every component of G- X has at least three vertices. The 3-restricted connectivity κ3(G) (in short κ3) of G is the cardinality of a minimum 3-restricted cut of G. X is called κ3-cut, if |X| = κ3. A graph G is κ3-connected, if a 3-restricted cut exists. Let G be a graph girth g ≥ 4, κ3(G) is min{d(x) + d(y) + d(z) - 4 : xyz is a 2-path of G}. It will be shown that κ3(G) = ξ3(G) under the condition of girth.展开更多
基金the National Natural Science Foundation of China (10671165)Specialized Research Fund for the Doctoral Program of Higher Education of China (20050755001)
文摘Let G = (V, E) be a connected graph. X belong to V(G) is a vertex set. X is a 3-restricted cut of G, if G- X is not connected and every component of G- X has at least three vertices. The 3-restricted connectivity κ3(G) (in short κ3) of G is the cardinality of a minimum 3-restricted cut of G. X is called κ3-cut, if |X| = κ3. A graph G is κ3-connected, if a 3-restricted cut exists. Let G be a graph girth g ≥ 4, κ3(G) is min{d(x) + d(y) + d(z) - 4 : xyz is a 2-path of G}. It will be shown that κ3(G) = ξ3(G) under the condition of girth.
