RTA Information: I derive the Shannon entropy equation utilizing two independent but complementary methods, and then generalize it to a higher dimensional space more natural to computer information processing

RTA Mathematics: I re-examine mathematics from a lens of dimensional geometry, and then utilize that to propose proofs to three unproven mathematical conjectures: the Riemann Hypothesis, the Collatz Conjecture, and the Kayeka Conjecture. Each proof shows a higher level of mathematical dimension

RTA Compression: I re-examine the classic Golong compression algorithm from the 1960's, that is still is use today, from a lens of dimensional geometry and entropy reduction. I then propose a generalizable 4-dimensional extension of Golong that may greatly increase computing efficiency.

RTA Physics (in progress): Here is the beginning of my exploration of unifying physics through the lens of RTA. This small section contains two separate, but complementary, derivations of the fine structure constant (whose value has long been accepted axiomatically by physicists) to nearly it's exact value using first principles and dimensional projection. The full paper is still being written.

Theoretical Research Papers

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