For a connected graph G = (V, E), an edge set S Ì E{Ssubset E} is called a k-restricted edge cut if G − S is disconnected and every component of G − S contains at least k vertices. The k-restricted edge connectivity of G, denoted by λ k (G), is defined as the cardinality of a minimum k-restricted edge cut. For two disjoint vertex sets U1,U2 Ì V(G){U_1,U_2subset V(G)}, denote the set of edges of G with one end in U 1 and the other in U 2 by [U 1, U 2]. Define xk(G)=min{|[U,V(G) U]|: U{xi_k(G)=min{|[U,V(G){setminus} U]|: U} is a vertex subset of order k of G and the subgraph induced by U is connected}. A graph G is said to be λ k -optimal if λ k (G) = ξ k (G). A graph is said to be super-λ k if every minimum k-restricted edge cut is a set of edges incident to a certain connected subgraph of order k. In this paper, we present some degree-sum conditions for balanced bipartite graphs to be λ k -optimal or super-λ k . Moreover, we demonstrate that our results are best possible.
展开▼
机译:对于连通图G =(V,E),如果将G-S断开并且G-S的每个分量至少包含k个顶点,则边集SÌE {Ssubset E}称为k限制边切割。 G的k限制的边缘连通性用λ k (G)表示,定义为最小k限制的边缘切割的基数。对于两个不相交的顶点集U 1 ,U 2 ÌV(G){U_1,U_2子集V(G)},表示G的边集,一端在U 1 和另一个U 2 中的另一个[U 1 ,U 2 ]。定义x k (G)= min {| [U,V(G)U] |:U {xi_k(G)= min {| [U,V(G){setminus} U] |:U}是G阶k的顶点子集,并且由U诱导的子图被连接}。如果λ k (G)=ξ k (G),则图G被称为λ k -最优。如果每个最小的k限制边切割都是入射到k阶某个连接子图的一组边,则该图被称为super-λ k 。在本文中,我们提出了平衡二部图为λ k -最佳或超λ k 的一些度和条件。此外,我们证明了我们的结果是最好的。
展开▼
