I put a 2-3 component corrective feedback loop (A) on top of the 5+ component dysfunctional feedback loop (B). Both loops are dynamic: B varies on timescale x and A senses variation and responds in timescale y. This produces order? Or does this produce nonlinear feedback interactions that then necessitate loop C with response time z to manage Bx/Ay chaos?
Analogously, how many loops do we need to adjust our grand circles and produce an accurate model of heliocentrism?
I put a 2-3 component corrective feedback loop (A) on top of the 5+ component dysfunctional feedback loop (B). Both loops are dynamic: B varies on timescale x and A senses variation and responds in timescale y. This produces order? Or does this produce nonlinear feedback interactions that then necessitate loop C with response time z to manage Bx/Ay chaos?
Analogously, how many loops do we need to adjust our grand circles and produce an accurate model of heliocentrism?