Here's a paper <https://arxiv.org/pdf/1311.3087.pdf> (2010) that describes a hub attraction dynamical growth model (HADGM) that exhibits fractal and probabilistic behavior for forming nodes in a complex network.
But you are looking for a descriptive word or phrase. Perhaps, "dynamic growth models with fractally-associative (or nonassociative) hubs." It seems to have something to do with the behavior of forming nodes (connections); so that seems to be the focus for your description. Not sure, but would agree that fractile behavior seems at the root of what you are trying to describe: some "hubbing" and "hubbing-resistance," so to speak. I like the amber Belgian beers ... 😋 On Fri, Aug 17, 2018 at 12:52 PM uǝlƃ ☣ <geprope...@gmail.com> wrote: > Excellent! I suppose the things I'm talking about would exhibit something > like a persistent homology. Of course, I'm looking for a word to describe > a subset of those (the particular way something like a capillary bed > branches out from the large blood vessels). So, it would have to be a type > of persistent homology. > > But the concept of "a filtration" is also evocative, both in its math and > biological/physical meanings. Much of what the tissue samplers are doing > is counting/indexing objects and branches in an attempt to identify > weirdness. > > On 08/17/2018 11:28 AM, Marcus Daniels wrote: > > Persistent homology? > > -- > ☣ uǝlƃ > > ============================================================ > FRIAM Applied Complexity Group listserv > Meets Fridays 9a-11:30 at cafe at St. John's College > to unsubscribe http://redfish.com/mailman/listinfo/friam_redfish.com > FRIAM-COMIC http://friam-comic.blogspot.com/ by Dr. Strangelove >
============================================================ FRIAM Applied Complexity Group listserv Meets Fridays 9a-11:30 at cafe at St. John's College to unsubscribe http://redfish.com/mailman/listinfo/friam_redfish.com FRIAM-COMIC http://friam-comic.blogspot.com/ by Dr. Strangelove
