Search results for "QA01 Combinatorics"
showing 3 items of 3 documents
Glorifying Elohim with Dispositive and Probative Facts for Subsequent Motions:Nosce Te Ipsum (A Logic and Mathematics’ Approach)
2018
Pythagoras made the imperative “Man know thyself; then thou shalt know the Universe and God.” One of the Egyptian Luxor Temple proverbs is "Man, know thyself, and you are going to know the gods” and another is "The body is the house of God.” In some ways all classical literature addresses this question. Shakespeare’s asked the famous question, “To be, or not to be, that is the question,” which can be said, “To (X) be (Ǝ), or (V) not (¬) to (X) be (Ǝ), that is (=) the question (a known unknown, ?),” or ((X) Ǝ) V (¬ (X) Ǝ) = ?. Dispositive and probative facts for subsequent motions can be shown as proof of knowing God, which can be simply stated with logic and mathematics: know (cog) God (I) …
Ornamenti un Simetrijas: Ornamentālo Rakstu Zīmju Valoda (intervija ar Modri Tenisonu)
2010
Ornaments and Symmetry: Language of Signs of Ornamental Tracery (see interview with Modris Tenisons http://www.blip.tv/file/3173653) In his first interview Modris Tenisons explains language of ornamentalistic signs for national ornamental belts using his discovered law of sieve displacement, which gives base duality element in ornamentalistic signs, and routine how to generate 240 elements of signs from 10 “seeds of chaos” sufficient to produce all ornametal belts of first order. He tells also about his discoverd 16 sign alphabet, that does the same. Pirmajā mutvārdu liecinājumā Modris Tenisons stāsta par ornamentālo rakstu zīmju veidošanās likumsakarībām sakrustojot divu krāsu diegus audum…
Galois groups and genetic code
2021
This article was inspired by the inverse problem of Galois theory. Galois groups are realized as number theoretic symmetry groups realized physically in TGD a symmetries of space-time surfaces. Galois confinement as an analog of color confinement is proposed in TGD inspired quantum biology . Galois groups, in particular simple Galois groups, play a fundamental role in the TGD view of cognition. The TGD based model of the genetic code involves in an essential manner the groups A5 (icosahedron), which is the smallest non-abelian simple group, and A4 (tetrahedron). The identification of these groups as Galois groups leads to a more precise view about genetic code. The question why the genetic …