Existence of magic rectangle sets over finite abelian groups

Abstract

Let a, b and c be positive integers. Let (G,+) be a finite abelian group of order abc. A G-magic rectangle set MRSG(a,b;c) is a collection of c arrays of size a× b whose entries are elements of a group G, each appearing exactly once, such that the sum of each row in every array equals a constant γ∈ G and the sum of each column in every array equals a constant δ∈ G. This paper establishes the necessary and sufficient conditions for the existence of an MRSG(a,b;c) for any finite abelian group G, thereby confirming a conjecture presented by Cichacz and Hinc.

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