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I am studying Toeplitz matrices. I have to find out the eigenvalues of the following Toeplitz matrix:

$$\begin{bmatrix} 2 & -8 & -24 \\ 3 & 2 & -8 \\ 1 & 3 & 2 \end{bmatrix}$$

Are there any different procedures to find out eigenvalues of Toeplitz matrices? Can't I use the general method of finding eigenvalues for them too? I need help with this. I need matlab code also. Edit: I was studying this paper http://www.sciencedirect.com/science/article/pii/0024379574900044

Thanks for help.

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    I wouldn't call that a circulant matrix. In a circulant matrix, you get each row by pushing each entry in the row above it one place to the right, with the last entry in the upper row cycling around to become the first entry in the lower. Your example doesn't have that. What you have is actually a *Toeplitz matrix*, see http://en.wikipedia.org/wiki/Toeplitz_matrix2012-07-05
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    @GerryMyerson Can I add pdf file of paper that I am studying?2012-07-05
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    @GerryMyerson I haven't studied them. I am sorry for my mistake. I am editing.2012-07-05
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    The Wikipedia article says something about calculating LU-decompositions of Toeplitz matrices, that might be worth following up on. You might also try typing Toeplitz eigenvalue into a search engine to see what comes up.2012-07-05
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    @GerryMyerson ok sir I am doing.2012-07-05
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    @GerryMyerson In paper it is mentioned that given matrix is 1-circulant matrix.2012-07-05
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    I don't have access to that paper.2012-07-05
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    @GerryMyerson I don't know how to upload here?2012-07-05
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    I don't think you can upload a full paper here. If it's just a scan of a part of a page, there has been some discussion recently on meta.math.stackexchange.com on how to upload images.2012-07-05
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    For tri-diagonal Toeplitz matrices there is an explicit formula. See p. 6 of this paper http://arxiv.org/abs/1110.66202012-07-05

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