**MATLAB does not guarrantee accuracy**

I find this claim unreasonable. On what grounds do you say that you can find a (significantly) more accurate implementation than MATLAB's highly refined computational algorithms?

AND... using MATLAB's `eig`

, the following is computed in less than half a second:

```
%// Generate the input matrix
X = ones(1000);
A = triu(X, -1) + tril(X, 1) - X;
%// Compute eigenvalues
v = eig(A);
```

It's fast alright!

**I need this to be pretty accurate (about 1e-06 error is OK)**

Remember that solving eigenvalues accurately is related to finding the roots of the characteristic polynomial. This specific 1000x1000 matrix is *very* ill-conditioned:

```
>> cond(A)
ans =
1.6551e+003
```

A general rule of thumb is that for a condition number of 10^{k}, you may lose up to *k* digits of accuracy (on top of what would be lost to the numerical method due to loss of precision from arithmetic method).

So in your case, I'd expect the results to be accurate up to an approximate error of 10^{-3}.