ON (a; d)-EAT LABELING OF SUBDIVISION OF TREES

ON (a; d)-EAT LABELING OF SUBDIVISION OF TREES

A. Raheem, M. Javaid

[PDF]

Abstract

An (a; d)-edge antimagic total (EAT) labeling on a graph w with p vertices and q edges is a one-to-one function from V (w)[E(w) onto the set of integers 1; 2; :::p+q with the property that for each edge uv, the set f (u)+ (uv)+ (v) : uv 2 E(w)g form an arithmetic progression (A. P.) starting with a and having common dierence d, where a > 0 and d  0 xed integers. A (a; d)-EAT labeling is called super (a; d)-EAT labeling if the smallest numbers are labels to the vertices. In this paper, we have to show that the graph of the subdivided star and subdivided caterpillar are super (a; d)-EAT labeling.

Keywords

subdivided stars, subdivided caterpillars, super (a; d)-EAT labeling.