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In [[mathematics]], particularly [[Matrix (mathematics)|matrix theory]], the ''n×n'' '''Lehmer matrix''' (named after [[Derrick Henry Lehmer]]) is the constant [[symmetric matrix]] defined by | |||
:<math>A_{ij} = | |||
\begin{cases} | |||
i/j, & j\ge i \\ | |||
j/i, & j<i. | |||
\end{cases} | |||
</math> | |||
Alternatively, this may be written as | |||
:<math>A_{ij} = \frac{\mbox{min}(i,j)}{\mbox{max}(i,j)}.</math> | |||
==Properties== | |||
As can be seen in the examples section, if ''A'' is an ''n×n'' Lehmer matrix and ''B'' is an ''m×m'' Lehmer matrix, then ''A'' is a [[submatrix]] of ''B'' whenever ''m''>''n''. The values of elements diminish toward zero away from the diagonal, where all elements have value 1. | |||
Interestingly, the [[matrix inverse|inverse]] of a Lehmer matrix is a [[tridiagonal matrix]], where the [[superdiagonal]] and [[subdiagonal]] have strictly negative entries. Consider again the ''n×n'' ''A'' and ''m×m'' ''B'' Lehmer matrices, where ''m''>''n''. A rather peculiar property of their inverses is that ''A<sup>-1</sup>'' is ''nearly'' a submatrix of ''B<sup>-1</sup>'', except for the ''A<sub>n,n</sub>'' element, which is not equal to ''B<sub>m,m</sub>''. | |||
A Lehmer matrix of order ''n'' has [[trace of a matrix|trace]] ''n''. | |||
==Examples== | |||
The 2×2, 3×3 and 4×4 Lehmer matrices and their inverses are shown below. | |||
:<math> | |||
\begin{array}{lllll} | |||
A_2=\begin{pmatrix} | |||
1 & 1/2 \\ | |||
1/2 & 1 | |||
\end{pmatrix}; | |||
& | |||
A_2^{-1}=\begin{pmatrix} | |||
4/3 & -2/3 \\ | |||
-2/3 & {\color{BrickRed}\mathbf{4/3}} | |||
\end{pmatrix}; | |||
\\ | |||
\\ | |||
A_3=\begin{pmatrix} | |||
1 & 1/2 & 1/3 \\ | |||
1/2 & 1 & 2/3 \\ | |||
1/3 & 2/3 & 1 | |||
\end{pmatrix}; | |||
& | |||
A_3^{-1}=\begin{pmatrix} | |||
4/3 & -2/3 & \\ | |||
-2/3 & 32/15 & -6/5 \\ | |||
& -6/5 & {\color{BrickRed}\mathbf{9/5}} | |||
\end{pmatrix}; | |||
\\ | |||
\\ | |||
A_4=\begin{pmatrix} | |||
1 & 1/2 & 1/3 & 1/4 \\ | |||
1/2 & 1 & 2/3 & 1/2 \\ | |||
1/3 & 2/3 & 1 & 3/4 \\ | |||
1/4 & 1/2 & 3/4 & 1 | |||
\end{pmatrix}; | |||
& | |||
A_4^{-1}=\begin{pmatrix} | |||
4/3 & -2/3 & & \\ | |||
-2/3 & 32/15 & -6/5 & \\ | |||
& -6/5 & 108/35 & -12/7 \\ | |||
& & -12/7 & {\color{BrickRed}\mathbf{16/7}} | |||
\end{pmatrix}. | |||
\\ | |||
\end{array} | |||
</math> | |||
==See also== | |||
* [[Derrick Henry Lehmer]] | |||
* [[Hilbert matrix]] | |||
==References== | |||
* M. Newman and J. Todd, ''The evaluation of matrix inversion programs'', Journal of the Society for Industrial and Applied Mathematics, Volume 6, 1958, pages 466-476. | |||
[[Category:Matrices]] | |||
{{Linear-algebra-stub}} | |||
Revision as of 11:52, 30 April 2013
In mathematics, particularly matrix theory, the n×n Lehmer matrix (named after Derrick Henry Lehmer) is the constant symmetric matrix defined by
Alternatively, this may be written as
Properties
As can be seen in the examples section, if A is an n×n Lehmer matrix and B is an m×m Lehmer matrix, then A is a submatrix of B whenever m>n. The values of elements diminish toward zero away from the diagonal, where all elements have value 1.
Interestingly, the inverse of a Lehmer matrix is a tridiagonal matrix, where the superdiagonal and subdiagonal have strictly negative entries. Consider again the n×n A and m×m B Lehmer matrices, where m>n. A rather peculiar property of their inverses is that A-1 is nearly a submatrix of B-1, except for the An,n element, which is not equal to Bm,m.
A Lehmer matrix of order n has trace n.
Examples
The 2×2, 3×3 and 4×4 Lehmer matrices and their inverses are shown below.
See also
References
- M. Newman and J. Todd, The evaluation of matrix inversion programs, Journal of the Society for Industrial and Applied Mathematics, Volume 6, 1958, pages 466-476.