I need to find the conditions for the real part of a complex number to be negative. I thought Reduce would be perfect for this, but it gives redundant output (even after simplification). For example:

```
In[543]: Reduce[{Re[-1 - Sqrt[a - b] ] < 0, a > 0, b > 0}, {a, b}, Complexes]
Out[543]: a > 0 && (0 < b < a || b >= a)
```

As a and b are assumed to be real because they appear in an inequality, there needs to be no further assumption about the relation between a and b, the result I expect is:

```
Out[543]: a > 0 && b > 0
```

is there a good reason why that is not obtained? The (in my eyes) redundant results accumulate for more complex expressions and I need to reduce quite a few of them. Is there a trick to get the expected result? I played around with choosing Reals as the domain and choosing no Domain at all, but nothing really gives me what I want. By the way I am analyzing the stability of fixed points by checking eigenvalues...a very common task.