On Arithmetic Cordial Labeling of Some Graphs

Abstract

Let η be a fixed positive integer. Let S be a subset of Z, :S× S Z be a binary function, and ζη:\∈ Z:(,η)=1\ \0,1\ be a function. For a simple connected graph G of order n, a bijective function f:V(G) S (where |S|=n) is called an arithmetic cordial labeling modulo η under S,ζη, if the induced function fη*:E(G) \0,1\, defined by fη*(uv)=0 whenever ζη(f(a) f(b))=0 or (f(a) f(b),η)≠ 1, and fη*(uv)=1 whenever ζη(f(a) f(b))=1, satisfies the condition |efη*(0)-efη*(1)|≤ 1, where efη*(i) is the number of edges with label i (i=0,1). In this paper, we explore the arithmetic cordial labeling of some graphs under conditions imposed on the function ζη. The graphs included are star graphs, ladder graphs, alternate cycle snake graphs, join graphs, corona graphs, and tensor product graphs.