Similarly to a couple of other recent posts here on the Forum, your central region is just a perfect extension of the bulk electrodes, and you can't expect sensible results to come from a finite bias calculation of that. Since the structure is perfectly periodic from z=-infinity to z=+infinity, you cannot apply a finite bias across it in the coherent, elastic approximation used in ATK, because there is nowhere for the voltage to drop naturally, i.e. there is no (potential) scattering and hence no resistance - and the slope of the voltage drop is a measure of the "local resistance". Thus, even if you can converge this at lower finite bias, and perhaps with some tricks at 0.6 V, the results are rather meaningless, so I would not spend time on it. You need some inhomogeneity in the middle for things to make sense, like a gate, a defect, an adsorbant, or similarly.
PS: Actually the central region kC-points are not used, so you can put any number for that. But 200 kC-points for the electrode can be a good idea in many cases. It's just not really the problem here.
