A diophantine problem concerning third order matrices

Abstract

In this paper we find a third order unimodular matrix, none of whose entries is 1 or -1, such that when each entry of the matrix is replaced by its cube, the resulting matrix is also unimodular. Further, we find third order square integer matrices (aij), none of the integers aij being 1 or -1, such that (aij)=k and (aij3)=k3, where k is a nonzero integer.

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