Some results concerning the valences of (super) edge-magic graphs

Abstract

A graph G is called edge-magic if there exists a bijective function f:V(G) E(G)→ \1, 2, … , V( G) + E( G) \ such that f(u) + f(v) + f(uv) is a constant (called the valence of f) for each uv∈ E( G) . If f(V (G)) =\1, 2, … , V( G) \, then G is called a super edge-magic graph. A stronger version of edge-magic and super edge-magic graphs appeared when the concepts of perfect edge-magic and perfect super edge-magic graphs were introduced. The super edge-magic deficiency μs(G) of a graph G is defined to be either the smallest nonnegative integer n with the property that G nK1 is super edge-magic or + ∞ if there exists no such integer n. On the other hand, the edge-magic deficiency μ(G) of a graph G is the smallest nonnegative integer n for which G nK1 is edge-magic, being μ(G) always finite. In this paper, the concepts of (super) edge-magic deficiency are generalized using the concepts of perfect (super) edge-magic graphs. This naturally leads to the study of the valences of edge-magic and super edge-magic labelings. We present some general results in this direction and study the perfect (super) edge-magic deficiency of the star K1,n.