Pathological Systems

When a real physical situation is modeled by a set of linear equations, we can anticipate that the set of equations will have a solution that matches the values of the quantities in the physical problem, at least as far as the equations truly do represent it.
Because of round-off errors, the solution vector that is calculated may imperfectly predict the physical quantity, but there is assurance that a solution exists, at least in principle.
Consequently, it must always be theoretically possible to avoid divisions by zero when the set of equations has a solution.
Here is an example of a matrix that has no inverse: What is the LU equivalent of

$\begin{displaymath} A=\left[ \begin{array}{rrr} 1 & -2 & 3 \\ 2 & 4 &-1 \\ -1 &-14 & 11\\ \end{array} \right] \end{displaymath}$
```
>> lu(A)
ans =
 2.0000      4.0000     -1.0000
-0.5000    -12.0000     10.5000
 0.5000      0.3333      0
```
Element A(3,3) cannot be used as a divisor in the back-substitution. That means that we cannot solve.
The definition of a singular matrix is a matrix that does not have an inverse.

2004-11-03