Title of article
Properties of the Brualdi–Li tournament matrix Original Research Article
Author/Authors
Rohan Hemasinha، نويسنده , , James R. Weaver، نويسنده , , Stephen J. Kirkland، نويسنده , , Jeffrey L. Stuart، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2003
Pages
11
From page
63
To page
73
Abstract
The Brualdi–Li tournament matrix is conjectured to have the largest spectral radius among all tournament matrices of even order. In this paper two forms of the characteristic polynomial of the Brualdi–Li tournament matrix are found. Using the first form it is shown that the roots of the characteristic polynomial are simple and that the Brualdi–Li tournament matrix is diagonalizable. Using the second form an expression is found for the coefficients of the powers of the variable λ in the characteristic polynomial. These coefficients give information about the cycle structure of the cycles of length 1–5 of the directed graph associated with the Brualdi–Li tournament matrix.
Keywords
Almost regular tournament , Brualdi–Li conjecture , Eigenvalues , Characteristic polynomial , tournament
Journal title
Linear Algebra and its Applications
Serial Year
2003
Journal title
Linear Algebra and its Applications
Record number
823788
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