0
$\begingroup$

Given the Toeplitz matrix

$$X = \begin{pmatrix} ~~~~\textbf{1} ~~~~\textbf{c} ~~~~\textbf{d} ~~~~0 ~~~~0 ~~~~0 ~~~~\textbf{d}~~~~ \\ ~~~~\textbf{c} ~~~~\textbf{1} ~~~~\textbf{c} ~~~~\textbf{d} ~~~~0 ~~~~0 ~~~~0~~~~ \\ ~~~~\textbf{d} ~~~~\textbf{c} ~~~~\textbf{1} ~~~~\textbf{c} ~~~~\textbf{d} ~~~~0 ~~~~0~~~~ \\ ~~~~0 ~~~~\textbf{d} ~~~~\textbf{c} ~~~~\textbf{1} ~~~~\textbf{c} ~~~~\textbf{d} ~~~~0~~~~ \\ ~~~~0 ~~~~0 ~~~~\textbf{d} ~~~~\textbf{c} ~~~~\textbf{1} ~~~~\textbf{c} ~~~~\textbf{d}~~~~ \\ ~~~~0 ~~~~0 ~~~~0 ~~~~\textbf{d} ~~~~\textbf{c} ~~~~\textbf{1} ~~~\textbf{c}~~~~ \\ ~~~~\textbf{d} ~~~~0 ~~~~0 ~~~~0 ~~~~\textbf{d} ~~~~\textbf{c} ~~~~\textbf{1}~~~~ \\ \end{pmatrix}$$

where $d$ and $c$ are different values between $-1$ and $0$. Furthermore,

$$2c + 2d = -1$$

My questions are to find expressions for

  1. Second largest eigenvalue modulus (SLEM) or eigenvalues

  2. Inverse of $X$

Thanks

  • 1
    $c$ and $d$ will have to be in the interval $[-\frac{1}{2}, 0]$ in order the have the relation $2c+2d=-1$.2012-10-10

1 Answers 1