Some new results on the integer-magic spectra of tessellation graphs


Let A be an abelian group with non-identity elements A∗. A graph is A-magic if it has an edge-labeling by elements of A∗ which induces a constant vertex labeling of the graph. In this paper we determine, for certain classes of triominoes and polyominoes, for which values of k ≥ 2 the graphs are Zk-magic. 


Figures and Tables

Sorry, we couldn't extract any figures or tables for this paper.

Slides referencing similar topics