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Magic squares on Abelian groups
Sylwia Cichacz, Dalibor Froncek · 2025-05-05 · via math.CO updates on arXiv.org

Let $(Γ,+)$ be an Abelian group of order $n^2$ and MS$_Γ(n)$ be an $n\times n$ array whose entries are all elements of $Γ$. Then MS$_Γ(n)$ is a $Γ$-magic square if all row, column, main and backward main diagonal sums are equal to the same element $μ\inΓ$. We prove that for every Abelian group $Γ$ of order $n^2$, $n>2$, there exists a magic square MS$_Γ(n)$ where the square entries are elements of $Γ$.

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