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引用次数: 3
摘要
设G = (V, E)为简单图。如果对于所有顶点v v (G),则集合S E(G)是G的边-顶点控制集(或简单地说是ev控制集);存在一条边e,使得e优于v。令表示所有具有基数i的e -支配集合的族。在本文中,我们得到了。利用这个递归公式,构造了一个多项式,我们称之为的边-顶点控制多项式(或简称为ev-控制多项式),并得到了该多项式的一些性质。
Edge-Vertex Dominating Sets and Edge-Vertex Domination Polynomials of Cycles
Let G = (V, E) be a simple graph. A set S E(G) is an edge-vertex
dominating set of G (or simply an ev-dominating set), if for all vertices v V(G); there exists an
edge eS such that e dominates v. Let denote the family of all ev-dominating sets of with cardinality i. Let . In this paper, we
obtain a recursive formula for . Using this
recursive formula, we construct the polynomial, , which we call edge-vertex domination polynomial of (or simply an ev-domination polynomial of ) and obtain some
properties of this polynomial.
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