On Legendre Cordial Labeling of Complete Graphs
Abstract
Let p be an odd prime. For a simple connected graph G of order n, a bijective function f:V(G)\1,2,…,n\ is said to be a Legendre cordial labeling modulo p if the induced function fp*:E(G) \0,1\, defined by fp* (uv)=0 whenever ([f(u)+f(v)]/p)=-1 or f(u)+f(v) 0(mod p) and fp* (uv)=1 whenever ([f(u)+f(v)]/p)=1, satisfies the condition |efp*(0)-efp*(1)|≤ 1 where efp*(i) is the number of edges with label i (i=0,1). This paper explores the characterization of the Legendre cordial labeling modulo p of the complete graph Kn using the concept of Legendre graph.
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