An edge labeling of graphs from Rados partition regularity condition

Abstract

A vertex v is called an AR-vertex, if v has distinct edge weight sums for each distinct subset of edges incident on v. i.e., if \x1,x2,…,xk\ are the edge labels of the edges incident on v, then the 2k subset sums are all distinct. An injective edge labeling f of a graph G is said to be an AR-labeling of G, if f:E → N is such that every vertex in G is an AR-vertex under f. A graph G is said to be an AR-graph, if there exists an AR-labeling f:E→ \1,2,…,m\, where m denotes the number of edges of G. A study of AR-labeling and AR-graphs is initiated in this paper.

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