Helix Prime Number Algorithm Theory [2017 Draft]

Here is an initial list of Notes & Conjectures compiled from the observed data sets so far. The Conjectures are merely speculation and unproven at this point which require more rigorous review and proofs.

Thanks for taking the time to review the information.

Notes:

1) Within the Integer Number Set [0 to Infinity] the Integer Numbers can either be Prime Numbers or Non-Prime Composite Numbers, that is mutually exclusive where an Integer Number cannot be both a Prime Number and a Non-Prime Composite Number

2) The Integer Number Set [0 to infinity] consists of a Helix Spiral Vortex Structure with 6 interwoven vectors in the form of 3 pairs made up of the [1V , 5V], [2V , 4V], & [3V , 6V] winding sequential number vector sets

3) The [2V , 4V] strand pair braid excludes all even numbers as Prime Numbers (Except Prime 2)

4) The [3V , 6V] strand pair braid excludes all numbers divisible by 3 as Prime Numbers (Except Prime 3)

5) The [1V , 5V] strand pair is made up of all odd numbers and contains all the Prime Numbers from 1 to Infinity (Helix Prime Number Vector Sequence HPNVS = 1V + 5V || HPNVS = N(1) [N + 4, N + 2 ...Infinity]) and is interwoven with the Non-Prime Number Vector Sequence (NPNVS) Composite Numbers (Cross Multiply [1VPS x 5 VPS] & [5VPS x 1VPS]) || [(N(HPNVS...) , + (N(HPNVS...) x 4) , + (N(HPNVS...) x 2)...]

6) The distribution of the Prime Number Set within the Integer Number Set is not randomly distributed, but is precise and exactly distributed as a result of the overlapping Non-Prime Number Vector Sequence (NPNVS) Fold Point Fractal Matrix patterns within a given parameter number field set; where the number of and the value of the Prime Numbers can be accurately calculated, mapped, and shown to fit exactly in between the overlapping Non-Prime Number Vector Sequence (NPNVS) Fold Point Fractal Matrix patterns

7) WIP

Helix Prime Number Algorithm Theory [2017 Draft]

Conjectures:

1) The Helix Prime Number Calculator using the Helix Prime Number Algorithm Theory can accurately give the exact number of and the values for the Primes Numbers for a given parameter number field set, where initial analysis shows a decreasing number of Prime Numbers as the values for parameter number field set increases which could be the result of the gap spacing between Prime Numbers that is dependent upon the Non-Prime Number Vector Sequence (NPNVS) Fold Point Fractal Matrix patterns

2) The Helix Prime Number Algorithm Theory can explain the existence of the Twin Primes which are the result of the Helix Spiral Vortex structure and the perpetual winding sequence that continues from the 5 vector to the 1 vector starting from 1 to infinity. The Helix Prime Number Calculator can give the exact number of and the values for the Twin Primes which can be accurately calculated for a given parameter number field set; where Brun's Constant can be disproven and discarded as being a useful calculation for finding Twin Primes

3) The Goldbachâ€™s Conjecture can be proven that all even numbers greater than 2 are comprised from the addition of 2 or more Prime Numbers (Or the difference between 2 Prime Numbers) by examining the [2V , 4V] & [3V , 6V] braided pair strands; where the [2V + 4V] pair strand divided by 2 results in recreating the Integer Number Set [1 to infinity] and the [3V + 6V] pair strand divided by 3 results in recreating the Integer Number Set [1 to infinity]

4) The Non-Prime Number Vector Sequence (NPNVS) Composite Numbers are comprised of the multiplication of 2 or more Prime Numbers; or inversely the NPNVS Composite Numbers can be factored into their component Prime Numbers

5) The gap between Prime Numbers can be accurately calculated and mapped, which are dependent upon the Non-Prime Number Vector Sequence (NPNVS) Fold Point Fractal Matrix patterns used to calculate the Prime Numbers set for a given parameter number field set, where the square root value (rounded up) for the connect number of the matrix field gives an approximate number value that is needed to completely fill-in the matrix number field with the Non-Prime Number Vector Sequence (NPNVS) Fold Point Fractal Matrix patterns

6) The Reimann Conjecture can be disproved as a good estimate for the approximate number of Prime Numbers for a given parameter number field set, as can all other attempts to estimate and to give an approximate value for the number of Primes for a given number field set; since the Helix Prime Number Calculator can calculate the exact number of and the values for the Prime Numbers Set for a given parameter number field set

7) A comprehensive and accurate complete list of Consecutive Prime Numbers can be generated and mapped for a given parameter number field set using the Helix Prime Number Calculator

8) The origin of the conjecture that there infinitely many primes of the form n^2 + 1 can be shown to be the function of adding 1 to a 4V number to get a 5V Prime; while the methodology can also be applied to Mersenne Primes [2^P - 1] calculated by subtracting 1 from a 2V number to get a 1V Prime

9) The origin of Mersenne Primes [2^P - 1] are Primes calculated by subtracting 1 from a 2V number to get a 1V Prime; where the methodology can also be applied to [n^2 + 1] by adding 1 to a 4V number to get a 5V Prime

10) RSA algorithms & technology are vulnerable to hacking by the development of a RSA Cracker using Composite Integer Fractal Zooming techniques and newly categorized Prime Number Rainbow Tables that can easily calculate large Prime Numbers with overtly advantageous processing power

11) WIP