Difference between revisions of "Manuals/calci/MOORE"
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*The Moore matrix has successive powers of the applied to the first column, so it is an mxn matrix of the form: | *The Moore matrix has successive powers of the applied to the first column, so it is an mxn matrix of the form: | ||
<math>\begin{bmatrix} | <math>\begin{bmatrix} | ||
| − | \alpha_1 & \alpha_1^{q} &\cdots & \alpha_1^{q}^{n-1} \\ | + | \alpha_1 & \{alpha_1}^{q} &\cdots & \{alpha_1}^{q}^{n-1} \\ |
| − | \alpha_2 & \alpha_2^{q} &\cdots & \alpha_2^{q}^{n-1} \\ | + | \alpha_2 & \{alpha_2}^{q} &\cdots & \{alpha_2}^{q}^{n-1} \\ |
| − | \alpha_3 & \alpha_3^{q} &\cdots & \alpha_3^{q}^{n-1} \\ | + | \alpha_3 & \{alpha_3}^{q} &\cdots & \{alpha_3}^{q}^{n-1} \\ |
\vdots & \ddots & \vdots \\ | \vdots & \ddots & \vdots \\ | ||
| − | \alpha_m & \alpha_m^{q} &\cdots & \alpha_m^{q}^{n-1} | + | \alpha_m & \{alpha_m}^{q} &\cdots & \{alpha_m}^{q}^{n-1} \\ |
\end{bmatrix} </math> | \end{bmatrix} </math> | ||
*In calci, MATRIX("moore") is giving the matrixwith the element 1 of order 3. | *In calci, MATRIX("moore") is giving the matrixwith the element 1 of order 3. | ||
*And MATRIX("moore",4,1..4) is giving Moore matrix starting element 1 to 4 of order 4. | *And MATRIX("moore",4,1..4) is giving Moore matrix starting element 1 to 4 of order 4. | ||
Revision as of 10:54, 30 April 2015
MATRIX("MOORE",order)
- is the size of the Moore matrix.
is the size of the Moore matrix.Description
- This function gives the moore matrix of order 3 with the element 1.
- A moore matrix, is a square matrix over a finite field.
- When moore matrix is a square matrix, then its deteminant is called a Moore determinant.
- But it is unrelated to the Moore determinant of a quaternionic Hermitian matrix.
- The Moore matrix has successive powers of the applied to the first column, so it is an mxn matrix of the form:
Failed to parse (unknown function "\begin{bmatrix}"): {\displaystyle \begin{bmatrix} \alpha_1 & \{alpha_1}^{q} &\cdots & \{alpha_1}^{q}^{n-1} \\ \alpha_2 & \{alpha_2}^{q} &\cdots & \{alpha_2}^{q}^{n-1} \\ \alpha_3 & \{alpha_3}^{q} &\cdots & \{alpha_3}^{q}^{n-1} \\ \vdots & \ddots & \vdots \\ \alpha_m & \{alpha_m}^{q} &\cdots & \{alpha_m}^{q}^{n-1} \\ \end{bmatrix} }
- In calci, MATRIX("moore") is giving the matrixwith the element 1 of order 3.
- And MATRIX("moore",4,1..4) is giving Moore matrix starting element 1 to 4 of order 4.