lizfcm/notes/Oct-11.org

* Diagonal Dominance
Suppose that A \in R^{n \times n} is diagonally dominant then Gaussian eliminiation of A produces no zero pivot
elements.

Def. A \in R^{n \times n} is diagonally dominant if for each i=1,2,...n |a_{i,i}| \geq \Sigma_{j=1}^n |a_i,j|


* To test solution code:
         [[1]
          [1]
Set y =   [\cdots]    \in R^n
          [1]]

Compute b=Ay
Solve Ax=b
deprecate common lisp solutions and write c; it's too much effort to keep up with the requirements for an archive. 2023-10-11 12:04:04 -04:00			`* Diagonal Dominance`
			`Suppose that A \in R^{n \times n} is diagonally dominant then Gaussian eliminiation of A produces no zero pivot`
			`elements.`

			`Def. A \in R^{n \times n} is diagonally dominant if for each i=1,2,...n \|a_{i,i}\| \geq \Sigma_{j=1}^n \|a_i,j\|`


			`* To test solution code:`
			`[[1]`
			`[1]`
			`Set y = [\cdots] \in R^n`
			`[1]]`

			`Compute b=Ay`
			`Solve Ax=b`