Star-Supermagic Decompositions of the Complete Bipartite Graph Minus a One-Factor

الملخص EN

Let G be a graph and let H be a subgraph of G.

Assume that G has an H-decomposition T={H1,H2,…,Ht} such that Hi≅H for all 1≤i≤t.

An H-supermagic decomposition of G is a bijection f:V(G)∪E(G)→1,2,…,VG+EG such that ∑v∈V(Hi)f(v)+∑e∈E(Hi)f(e) is a constant k for each Hi in the decomposition T and fVG=1,2,…,VG.

If G admits an H-supermagic decomposition, then G is called H-supermagic decomposable.

In this paper, we give necessary and sufficient conditions for the existence of K1,n-1-supermagic decomposition of the complete bipartite graph Kn,n minus a one-factor.