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Is There a Way to Form Dynamical Landscapes Across Levels?
The way that these landscapes are calculated these days is using spiking rates from neurons. Are there attractor landscapes among the glea, and how would cross levels with neural activity and glea activity and slow nera modulators? Do you think we're going to be always contained in one, you know, one level? I think ther stagt to be ineraction between levels. You haven't touched on the questions of lighet, you know how. And i want to pare with the question whether manifold are always going to be low dimensional enough for us to understand them or not. Or if there will be cognitive processes that are too high-level for a dynamical systems approach