We are generalizing the notion of container and interval in terms of boundaries.
If possible, we want to ground all analytic structure in the topology of the Closed Loop, mapping from serial/linear sequential forms into the holistic all-at-once everything-at-the-same-time framework of the loop.
So a question arises.
How can we define the contents of a Venn diagram with its continuous circle-based boundary, so as to distinguish "what is IN the set" (inside the circle) and "what is NOT IN the set" (outside the circle)?
The answer is -- this structure is hierarchical.
Is the hierarchical model isomorphic to the Venn diagram? We are studying the meaning of isomorphic - along with other related concepts that might be grounded together as a "family" -- such as identity, equality, similarity.
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