I take "confirmed good predicted" to mean that you predicted a new response under a previously untested condition with your model and the result did not contradict the prediction.
The axial points (not "alpha points") are unique to the design method that you used. Central composite designs use axial points to estimate the second-order terms (non-linear effects) for a particular factor. You can always change the factor level to a more practical value after you make the data table. The old CCD method is not that flexible. Custom design does not use axial points for construction and therefore avoids exceeding the original factor range, by the way.
Why do you say that there is no aliasing or confounding of terms with RSM? How do you justify this claim? I do not think you understand the meaning and use of the terms 'alias' and 'confounded.' Also, such concepts only make sense in the old design methods of factorial designs. Correlation is a more general and inclusive term that applies to both the old designs and new designs.
The statement that you will use the estimation efficiency and power analysis once you pick a model is nonsense. They are used to evaluate a design before observing the response data. The model is selected after observing the response, at which point the estimation efficiency and power have no meaning.
Be careful with the "window of interest" mindset. I hope that you do not mean that you select factor ranges so that they are limited by where the best setting is expected. That approach usually produces small effects that difficult to estimate and test.
I have seen another reference to using DSD and space-filling designs together. Can you tell me where you found this idea?
Best of luck.
