Constructions of local antimagic 3-colorable graphs of fixed odd size | matrix approach

Abstract

An edge labeling of a connected graph G = (V, E) is said to be local antimagic if there is a bijection f:E \1,… ,|E|\ such that for any pair of adjacent vertices x and y, f+(x)= f+(y), where the induced vertex label f+(x)= Σ f(e), with e ranging over all the edges incident to x. The local antimagic chromatic number of G, denoted by la(G), is the minimum number of distinct induced vertex labels over all local antimagic labelings of G. In this paper, we give three ways to construct a (3m+2)× (2k+1) matrix that meets certain properties for m=1,3 and k 1. Consequently, we obtained many (disconnected) graphs of size (3m+2)(2k+1) with local antimagic chromatic number 3.