on Uniqueness and the concept of Uniqueness attractors in maths

Subject: on Uniqueness and the concept of Uniqueness attractors in maths

John McCarty <@geez-us.com>

9:27 AM (42 minutes ago)

: : : Diaspora : : :

btw , ( obviously , nerd alert here ) - on the two different types of 'uniqueness' attractors : that of the elliptics and that of the prime number system

Primes are overlaid on elliptics and vice versa on cardinal-space ( or cubically-dividing space ). elliptics are new ; an exciting topic in maths and encryption , etc ( likely as they seem truly random and truly they can be - just keep digging to another level deeper ;) . ( the Reimann hypothesis , quite open and important is asking what is the structure of the primes : well , it is much easier to see as the elliptics in e-Space though the meta levels may need to be morphed for the patterns to be interpretable between the spaces ).

It is clear now to me that primes and the elliptic points of infinity are different sides of the same coin and you can see this behaviour readily when it ends up on edge : prime pairs would correspond to approaching the elliptic vortex from the two chiral sides of the elliptic 'grain' as the number 2 ( splitting ) is common in cardinals ( any even number ). One should be able to predict where these will crease the prime space. I think of points of infinity almost like a chaos drain that dendritically, similar to tree morphology , fractally explores space ( thus crossing many dimension compressions readily ) and has these nodes that , now , it seems , allows 2D prime pairs to circle iso-cardinally at some distance. But , like a shrink wrap that reveals as you heat and shrink , as you probe under the cardinal space , the primes tend to end up on shore either over or splitting these points of infinity in the base , modular maths that have this bit of grain - but the elliptics may be quite fractally deep that are forming these attractor eddies or other interesting structures on the surface. how these complex structures affect our physical reality could be relevant and they likely are useful mathematically and thus , computationally. You see where I keep ending up at - what my interest is , in these considerations in physics and maths - and , thus , to what it might lead.