On the Coefficients of the Permanent and the Determinant of a Circulant Matrix. Applications

Emilia Mezzetti; Liena Colarte; Mart\'i Salat; Rosa Maria Mir\'o-Roig

arxiv: 1806.05905 · v2 · pith:XZ6QEC5Unew · submitted 2018-06-15 · 🧮 math.AG · math.AC· math.CO

On the Coefficients of the Permanent and the Determinant of a Circulant Matrix. Applications

Liena Colarte , Emilia Mezzetti , Rosa Maria Mir\'o-Roig , Mart\'i Salat This is my paper

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keywords circulantdeterminantmatrixpermanentrespapplicationapplicationscoefficients

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Let $d(N )$ (resp. $p(N )$) be the number of summands in the determinant (resp. permanent) of an $N\times N$ circulant matrix $A = (a_{ij} )$ given by $a_{ij} = X_{i+j}$ where $i + j$ should be considered $\mod N$ . This short note is devoted to prove that $d(N ) = p(N )$ if and only if $N$ is a prime power. We then give an application to homogeneous monomial ideals failing the Weak Lefschetz property.

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On the Coefficients of the Permanent and the Determinant of a Circulant Matrix. Applications

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