Abstract
Let G be a non-trivial, simple, finite, connected and undirected graph of order n and size m. An induced acyclic graphoidal decomposition (IAGD) of G is a collection ψ of non-trivial and internally disjoint induced paths in G such that each edge of G lies in exactly one path of ψ. For a labeling f : V → {1, 2, 3, . . . ,n}, let ↑ Gf be the directed graph obtained by orienting the edges uv of G from u to v, provided f(u) < f(v). If the set ψf of all maximal directed induced paths in ↑ Gf with directions ignored is an induced path decomposition of G, then f is called an induced graphoidal labeling of G and G is called an induced label graphoidal graph. The number ηil = min{|ψf| : f is an induced graphoidal labeling of G} is called the induced label graphoidal decomposition number of G. In this paper we introduce and study the concept of induced graphoidal labeling as an extension of graphoidal labeling.
Path Decomposition Number of Certain Graphs
