Difference between revisions of "Manuals/calci/TOEPLITZ"

Revision as of 10:37, 5 May 2015

MATRIX("TOEPLITZ",order)

$order$ is the size of the Toeplitz matrix.

Description

This function gives the matrix of order 3 with the property of toeplitz matrix.
A Toeplitz matrix is a matrix with the constant values along negative sloping diagonals(descending diagonal from left to right).
If the i,j element of A is denoted $A_{i,j}$ , then we have

$A_{i,j}=A_{i+1,j+1}=a_{i-j}$ .

Any nxn matrix A of the form:

${\begin{bmatrix}a_{0}&a_{-1}&a_{-2}&\cdots &a_{-n+1}\\a_{1}&a_{0}&a_{-1}&\cdots \\a_{2}&a_{1}&\cdots \\\vdots &\ddots &\vdots \\0&\cdots &0\end{bmatrix}}$ ${\begin{bmatrix}a_{0}&a_{-1}&a_{-2}&\ldots &\ldots &a_{-n+1}\\a_{1}&a_{0}&a_{-1}&\ddots &&\vdots \\a_{2}&a_{1}&\ddots &\ddots &\ddots &\vdots \\\vdots &\ddots &\ddots &\ddots &a_{-1}&a_{-2}\\\vdots &&\ddots &a_{1}&a_{0}&a_{-1}\\a_{n-1}&\ldots &\ldots &a_{2}&a_{1}&a_{0}\end{bmatrix}}$

The property of Toeplitz matrix is :Toeplitz matrices are persymmetric.
Symmetric Toeplitz matrices are both centrosymmetric and bisymmetric.
Toeplitz matrices commute asymptotically.

Examples

MATRIX("toeplitz",15,1..10)

A = \begin{bmatrix}

 a_{0} & a_{-1} & a_{-2} & \ldots & \ldots  &a_{-n+1}  \\
 a_{1} & a_0  & a_{-1} &  \ddots   &  &  \vdots \\
 a_{2}    & a_{1} & \ddots  & \ddots & \ddots& \vdots \\ 
\vdots &  \ddots & \ddots &   \ddots  & a_{-1} & a_{-2}\\
\vdots &         & \ddots & a_{1} & a_{0}&  a_{-1} \\

a_{n-1} & \ldots & \ldots & a_{2} & a_{1} & a_{0} \end{bmatrix}

@@ Line 1: / Line 1: @@
-<div style="font-size:30px">'''TOEPLITZ'''</div><br/>
+<div style="font-size:30px">'''MATRIX("TOEPLITZ",order)'''</div><br/>
+*<math>order</math> is the size of the Toeplitz matrix.
+==Description==
+*This function gives the matrix of order 3 with the property of toeplitz matrix.
+*A Toeplitz matrix is a matrix with the constant values  along negative sloping diagonals(descending diagonal from left to right).
+*If the i,j element of A is denoted <math>A_{i,j}</math>, then we have
+<math>A_{i,j} = A_{i+1,j+1} = a_{i-j}</math>.
+*Any nxn matrix A of the form:
+<math>\begin{bmatrix}
+a_0 & a_{-1} & a_{-2} & \cdots & a_{-n+1} \\
+a_1 & a_0 & a_{-1} & \cdots  \\
+a_2 & a_1 & \cdots \\
+\vdots & \ddots & \vdots \\
+      & \cdots & 0
+\end{bmatrix}</math>
+<math>\begin{bmatrix}
+  a_{0} & a_{-1} & a_{-2} & \ldots & \ldots  &a_{-n+1}  \\
+  a_{1} & a_0  & a_{-1} &  \ddots   &  &  \vdots \\
+  a_{2}    & a_{1} & \ddots  & \ddots & \ddots& \vdots \\
+ \vdots &  \ddots & \ddots &   \ddots  & a_{-1} & a_{-2}\\
+ \vdots &         & \ddots & a_{1} & a_{0}&  a_{-1} \\
+a_{n-1} &  \ldots & \ldots & a_{2} & a_{1} & a_{0}
+\end{bmatrix} </math>
+*The property of Toeplitz matrix is :Toeplitz matrices are persymmetric.
+*Symmetric Toeplitz matrices are both centrosymmetric and bisymmetric.
+*Toeplitz matrices commute asymptotically.
+==Examples==
+*MATRIX("toeplitz",15,1..10)
+A =
+\begin{bmatrix}
+  a_{0} & a_{-1} & a_{-2} & \ldots & \ldots  &a_{-n+1}  \\
+  a_{1} & a_0  & a_{-1} &  \ddots   &  &  \vdots \\
+  a_{2}    & a_{1} & \ddots  & \ddots & \ddots& \vdots \\
+ \vdots &  \ddots & \ddots &   \ddots  & a_{-1} & a_{-2}\\
+ \vdots &         & \ddots & a_{1} & a_{0}&  a_{-1} \\
+a_{n-1} &  \ldots & \ldots & a_{2} & a_{1} & a_{0}
+\end{bmatrix}

Difference between revisions of "Manuals/calci/TOEPLITZ"

Revision as of 10:37, 5 May 2015

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