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Real edge spans of distance two labelings of graphs
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作者 戴本球 林文松 《Journal of Southeast University(English Edition)》 EI CAS 2009年第4期557-562,共6页
An L(j, k)-labeling of a graph G is an assignment of nonnegative integers to the vertices of G such that adjacent vertices receive integers which are at least j apart, and vertices at distance two receive integers w... An L(j, k)-labeling of a graph G is an assignment of nonnegative integers to the vertices of G such that adjacent vertices receive integers which are at least j apart, and vertices at distance two receive integers which are at least k apart. Given an L(j, k)-labeling f of G, define the L(j, k) edge span of f, βj,k(G,f) =max{ |f(x)-f(y)|: {x,y}∈E(G)}. The L(j,k) edge span of G, βj,k (G) is min βj,k( G, f), where the minimum runs over all L(j, k)-labelings f of G. The real L(.j, k)-labeling of a graph G is a generalization of the L(j, k)-labeling. It is an assignment of nonnegative real numbers to the vertices of G satisfying the same distance one and distance two conditions. The real L(j, k) edge span of a graph G is defined accordingly, and is denoted by βj,k(G). This paper investigates some properties of the L(j, k) edge span and the real L(j, k) edge span of graphs, and completely determines the edge spans of cycles and complete t-partite graphs. 展开更多
关键词 l j k -labeling real lj k -labeling lj k edge span real lj k edge span frequency assignment
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