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Eigenvectors of Permutation Matrices

  • Garca-Planas M
  • Magret M
Advances in Pure Mathematics (2015) 05(07) 390-394
DOI: 10.4236/apm.2015.57038
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Abstract

The spectral properties of special matrices have been widely studied, because of their applications. We focus on permutation matrices over a finite field and, more concretely, we compute the minimal annihilating polynomial, and a set of linearly independent eigenvectors from the decomposition in disjoint cycles of the permutation naturally associated to the matrix.

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Garca-Planas, M. I., & Magret, M. D. (2015). Eigenvectors of Permutation Matrices. Advances in Pure Mathematics, 05(07), 390–394. https://doi.org/10.4236/apm.2015.57038

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