• Title of article

    Alexandrov’s inequality and conjectures on some Toeplitz matrices Original Research Article

  • Author/Authors

    Ivo Kleme?، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2007
  • Pages
    22
  • From page
    164
  • To page
    185
  • Abstract
    We study determinant inequalities for certain Toeplitz-like matrices over C. For fixed n and N greater-or-equal, slanted 1, let Q be the n × (n + N − 1) zero–one Toeplitz matrix with Qij = 1 for 0 less-than-or-equals, slant j − i less-than-or-equals, slant N − 1 and Qij = 0 otherwise. We prove that det(QQ*) is the minimum of det(RR*) over all complex matrices R with the same dimensions as Q satisfying midRijmid greater-or-equal, slanted 1 whenever Qij = 1 and Rij = 0 otherwise. Although R has a Toeplitz-like band structure, it is not required to be actually Toeplitz. Our proof involves Alexandrov’s inequality for polarized determinants and its generalizations. This problem is motivated by Littlewood’s conjecture on the minimum 1-norm of N-term exponential sums on the unit circle. We also discuss polarized Bazin–Reiss–Picquet identities, some connections with k-tree enumeration, and analogous conjectured inequalities for the elementary symmetric functions of QQ*.
  • Keywords
    Toeplitz matrix , 1-norm , Inequality , Determinant , Mixed discriminant , Minor , tree , exponential sum
  • Journal title
    Linear Algebra and its Applications
  • Serial Year
    2007
  • Journal title
    Linear Algebra and its Applications
  • Record number

    825500