On bridge graphs with local antimagic chromatic number 3

Abstract

Let G=(V, E) be a connected graph. A bijection f: E \1, …, |E|\ is called a local antimagic labeling if for any two adjacent vertices x and y, f+(x)≠ f+(y), where f+(x)=Σe∈ E(x)f(e) and E(x) is the set of edges incident to x. Thus a local antimagic labeling induces a proper vertex coloring of G, where the vertex x is assigned the color f+(x). The local antimagic chromatic number la(G) is the minimum number of colors taken over all colorings induced by local antimagic labelings of G. In this paper, we present some families of bridge graphs with la(G)=3 and give several ways to construct bridge graphs with la(G)=3.