• Title of article

    The structure of matrices with a maximum multiplicity eigenvalue Original Research Article

  • Author/Authors

    Michael I. Gekhtman and Charles R. Johnson، نويسنده , , Ant?nio Leal Duarte، نويسنده , , Carlos M. Saiago، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2008
  • Pages
    12
  • From page
    875
  • To page
    886
  • Abstract
    There is remarkable and distinctive structure among Hermitian matrices, whose graph is a given tree T and that have an eigenvalue of multiplicity that is a maximum for T. Among such structure, we give several new results: (1) no vertex of T may be “neutral”; (2) neutral vertices may occur if the largest multiplicity is less than the maximum; (3) every Parter vertex has at least two downer branches; (4) removal of a Parter vertex changes the status of no other vertex; and (5) every set of Parter vertices forms a Parter set. Statements (3), (4) and (5) are also not generally true when the multiplicity is less than the maximum. Some of our results are used to give further insights into prior results, and both the review of necessary background and the development of new structural lemmas may be of independent interest.
  • Keywords
    Hermitian matrices , Eigenvalues , multiplicities , Trees , Maximum multiplicity , Path cover number , Partervertices
  • Journal title
    Linear Algebra and its Applications
  • Serial Year
    2008
  • Journal title
    Linear Algebra and its Applications
  • Record number

    826044