Thank, Josh ... I already understand that everything must be understood as you here state. But certainly feel that some of the remarks at the document then should be reworded, to avoid the feeling of that, say, P-small delta can be forfeited in braces "because their flexural action doesn't contribute to lateral stability", because if , for example, someone is caught with a slender brace loaded enough to above the limit relative to the Euler critical buckling load (say on weak axis) they can be missing some important consideration.
On the other hand and once understood how RISA was operating respect P-Delta I was soon using it with generous divisions of the columns to capture the P-small delta effect; the intent was always to get some "advanced steel design"-like setup where (disregarding that RISA is always doing the code check for the steel member) you may enter easily manually to check yourself in nearly a strength of material approach, or if you want, in almost mere sectional analysis -since with the subdivisions and P-Delta it was admitted (I was reading in the mid nineties') a sure K=1 was admitted- and so manual checks were still an interesting possibility.
I am still intrigued with the cases of curved members ... in what I am aligning with the issues of the Achilles turtle or the worries about the early era of differential calculus, for a polygon is never a curve, and, say, for a circumference, rotation relative to developed length is always the same -so P-small delta shows there to be a stubborn companyon at the orders of magnitude bigger curvatures of curved members, even if reducible by subdivision; it is my understanding that it is mathematically sound and proved at the basic theory for Finite Element Methods that our finite and discrete representation in the mathematical model when well stated with the lumped properties and basic relationships and in fine mesh enough converge to the actual solution, and furthermore that this can be "verified" for cases where a symbolical solution exists (in what maybe somewhat adventurously they would be admitting the proof for the part as the proof for the whole ... if not ... why to resource to that?, I mean if undoubtedly proven, why to resource to such kind of example proof?), and furthermore, lots of the practicalities of numerical analysis (everything not basically symbolical, rare in a matter dealing on numbers) is based precisely on the developments of differential and integral calculus ... based precisely in discrete representations of continuity, a fish eating its tail situation. See, I would love to know more about mathematics.
