A Characterisation of Strong Integer Additive Set-Indexers of Graphs

Abstract

An integer additive set-indexer is defined as an injective function f:V(G)→ 2N0 such that the induced function gf:E(G) → 2N0 defined by gf (uv) = f(u)+ f(v) is also injective, where f(u)+f(v) is the sumset of f(u) and f(v). If gf(uv)=k~∀~uv∈ E(G), then f is said to be a k-uniform integer additive set-indexers. An integer additive set-indexer f is said to be a strong integer additive set-indexer if |gf(uv)|=|f(u)|.|f(v)|~∀ ~ uv∈ E(G). We already have some characteristics of the graphs which admit strong integer additive set-indexers. In this paper, we study the characteristics of certain graph classes, graph operations and graph products that admit strong integer additive set-indexers.