• Title of article

    Spectrally arbitrary patterns: Reducibility and the 2n conjecture for n = 5 Original Research Article

  • Author/Authors

    Luz M. DeAlba، نويسنده , , Irvin R. Hentzel، نويسنده , , Leslie Hogben، نويسنده , , Judith McDonald، نويسنده , , Rana Mikkelson، نويسنده , , Olga Pryporova، نويسنده , , Bryan Shader، نويسنده , , Kevin N. Vander Meulen، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2007
  • Pages
    15
  • From page
    262
  • To page
    276
  • Abstract
    A sign pattern Z (a matrix whose entries are elements of {+, −, 0}) is spectrally arbitrary if for any self-conjugate spectrum there is a real matrix with sign pattern Z having the given spectrum. Spectrally arbitrary sign patterns were introduced in [J.H. Drew, C.R. Johnson, D.D. Olesky, P. van den Driessche, Spectrally arbitrary patterns, Linear Algebra Appl. 308 (2000) 121–137], where it was (incorrectly) stated that if a sign pattern Z is reducible and each of its irreducible components is a spectrally arbitrary sign pattern, then Z is a spectrally arbitrary sign pattern, and it was conjectured that the converse is true as well; we present counterexamples to both of these statements. In [T. Britz, J.J. McDonald, D.D. Olesky, P. van den Driessche, Minimal spectrally arbitrary patterns, SIAM J. Matrix Anal. Appl. 26 (2004) 257–271] it was conjectured that any n ×n spectrally arbitrary sign pattern must have at least 2n nonzero entries; we establish that this conjecture is true for 5 × 5 sign patterns. We also establish analogous results for nonzero patterns.
  • Keywords
    Spectrally arbitrary sign pattern , Reducible sign pattern , Irreducible sign pattern , Potentially nilpotent , Sign pattern , Nonzero pattern
  • Journal title
    Linear Algebra and its Applications
  • Serial Year
    2007
  • Journal title
    Linear Algebra and its Applications
  • Record number

    825575