As data I get a matrix A but in my algorithm I need to work on its inverse. What I do is:

```
C = inv(A) + B;
```

Then in another line I update A. In the next cycles I also need (updated) A inverse, again for this algorithm. And so on. In the later cycles I get this:

```
Matrix is close to singular or badly scaled. Results may be inaccurate. RCOND = 1.425117e-019
```

or this:

```
Warning: Matrix is singular to working precision.
```

or this:

```
Warning: Matrix is singular, close to singular or badly scaled. Results may be inaccurate. RCOND = NaN.
```

Can you help me how to avoid such singularity? Matrix is squared always.

`inv`

@RodyOldenhuis - can you take it from here? – Shai Jun 23 '13 at 19:11theoreticalvalue, but not muchpracticalvalue. MATLAB's implementation of`inv()`

is not poor, theuse of itis simply a sign of a poor program design (in any non-educational context). This statement is not limited to MATLAB; it is the outcome of a bunch of proven theorems in numerical math. In the context of finite-precision number systems, it's like trying to prove the superiority of the aether over general relativity. – Rody Oldenhuis Jun 24 '13 at 9:20