Similar Order of Magnitude (spin 5)

Tip

This section is referring to wiki page-14 of gist section-10 that is inherited from the gist section- by prime spin-23 and span- with the partitions as below.

  1. Symmetrical Breaking (spin 1)
  2. The Angular Momentum (spin 2)
  3. Entrypoint of Momentum (spin 3)
  4. The Mapping of Spacetime (spin 4)
  5. Similar Order of Magnitude (spin 5)
  6. The Search for The Graviton (spin 6)
  7. Elementary Retracements (spin 7)
  8. The Recycling Momentum (spin 8)
  9. Exchange Entrypoint (spin 9)
  10. The Mapping Order (spin 10)
  11. Magnitude Order (spin 11)

Double Beta Decay

Every second, trillions upon trillions of the tiny particles shoot down to Earth from space almost completely unaffected by any matter they come across.

image

Note

Feynman diagram of neutrinoless double beta decay, with two neutrons decaying to two protons.

  • The only emitted products in this process are two electrons, which can occur if the neutrino and antineutrino are the same particle (i.e. Majorana neutrinos) so the same neutrino can be emitted and absorbed within the nucleus.
  • In conventional double beta decay, two antineutrinos — one arising from each W vertex — are emitted from the nucleus, in addition to the two electrons.

The detection of neutrinoless double beta decay is thus a sensitive test of whether neutrinos are Majorana particles. (Wikipedia)

Quantum Field Theory

Note

We analyze a simple extension of the Standard Model (SM) with a dark sector composed of a scalar and a fermion, both singlets under the SM gauge group but charged under a dark sector symmetry group.

  • Sterile neutrinos, which are singlets under both groups, mediate the interactions between the dark sectorand the SM particles, and generate masses for the active neutrinos via the seesawmechanism.
  • We explore the parameter space region where the observed Dark Matter relic abundance is determined by the annihilation into sterile neutrinos, both for fermion and scalar Dark Matter particles. The scalar Dark Matter case provides an interesting alternative to the usual Higgs portal scenario.

We also study the constraints from direct Dark Matter searches and the prospects for indirect detectionvia sterile neutrino decays to leptons, which may be able to rule out Dark Matter masses below and around 100 GeV. (Sterile Neutrino portal to Dark Matter II - pdf)

Sterile Neutrino portal to Dark Matter II

Note

The current status of the nucleon decay experiments is as follows: the partial lifetimelimit on p → π0e+ is τ (p → π0e+) > 1.67 × 1034 years, and the bound on the partial lifetime for p → K+ν is τ (p → K+ν) > 6.6 × 1033 years [42, 43]. It is expected that a future experiment, the Hyper-Kamiokande, may achieve a sensitivity of 5-10 times the present bound. (Proton Decay - pdf)

image

p r i m e s
1 0 0 0 0 0
2 1 0 0 0 1 ◄--- #29 ◄--- #61 👈 1st spin
3 2 0 1 0 2 👉 2
4 3 1 1 0 3 👉 89 - 29 = 61 - 1 = 60
5 5 2 1 0 5 👉 11 + 29 = 37 + 3 = 40 
          6 👉 11s Composite Partition ◄--- 102 👈 4th spin
6 7 3 1 0 7 ◄--- #23 👈 f(#30) ◄--- break MEC30 symmetry
7 11 4 1 0 11 ◄--- #19 👈 30
8 13 5 1 0 13 ◄--- #17 ◄--∆32-- #49 👈 30 ✔️
9 17 0 1 1 17 ◄--- 7th prime 👈 f(#36) ◄--- antisymmetric state ✔️
           18 👉 7s Composite Partition ◄--- 168 👈 7th spin
10 19 1 1 1 ∆1 ◄--- 0th ∆prime ◄--- Fibonacci Index #18
-----
11 23 2 1 1 ∆2 ◄--- 1st ∆prime ◄--- Fibonacci Index #19 ◄--- #43
..
..
40 163 5 1 0 ∆31 ◄- 11th ∆prime ◄-- Fibonacci Index #29 👉 11
-----
41 167 0 1 1 ∆0
42 173 0 -1 1 ∆1
43 179 0 1 1 ∆2 ◄--- ∆∆1
44 181 1 1 1 ∆3 ◄--- ∆∆2 ◄--- 1st ∆∆prime ◄--- Fibonacci Index #30
..
..
100 521 0 -1 2 ∆59 ◄--- ∆∆17 ◄--- 7th ∆∆prime ◄--- Fibonacci Index #36  👉 7s
-----

Exact Dark Symmetry

image

lightning speed ÷ shockwave speed = 300000km/s ÷ 3km/s = 100000 ÷ 1

  Sub  | i  |     β | f   
=======+====+=======+=======  ===   ===   ===   ===   ===   ===
 1:1:0 | 1  |     1 | 2 {71}   1     1     |     |     |     |
-------+----+-------+-------  ---   ---    |     |     |     |
 1:2:1 | 2  |     2 | 3 {71}         |     |     |     |     |
-------+----+-------+----            |     |     |     |     |
*1:2:2 | 3  |     3 | 7 = 1 + 2x3    |     |     |     |     |
-------+----+-------+----            |     |     |     |     |
*1:3:3 | 4  |     4 | 10 = 9 + 1     |     |     |     |     |  
-------+----+-------+----            |     |     |     |     |
 1:3:4 | 5  |     5 | 11 = 9 + 2     |     |     |     |     |
-------+----+-------+----            9     1‘    |    Δ100   |
*1:3:5 | 6  |     6 | 12 = 9 + 3     |     |     |     |     |
-------+----+-------+----            |     |     |     |     |
*1:4:6 | 7  |     7 | 13 = 9 + 4     |     |     |     |     |
-------+----+-------+----            |     |     |     |     |
 1:4:7 | 8  |     8 | 14 = 9 + 5     |     |     |     |     |
-------+----+-------+----            |     |     |     |     |
*1:4:8 |{9} |     9 | 15 = 9 + 6     |     |     |     |     |
-------+----+-------+----            |     |     |     |     |
*1:4:9 |{10}|    10 | 19 = 9 + 10    |     |     |     |     |
=======+====+=======+====           ===   ---    1"   ---    |
 2:1:0 | 11 |    20 | 20 = 19 + log 10¹    |     |     |     |
-------+----+-------+----                  |     |     |     |
 2:2:1 | 12 |    30 | 26 = 20 + 2x3        |     |     |     |
-------+----+-------+----                  |     |     |     |
*2:2:2 | 13 |    40 | 27 = 26 + 1          |     |     |     |
-------+----+-------+----                  |     |     |     |
*2:3:3 | 14 |    50 | 28 = 26 + 2          |     |     |     |
-------+----+-------+----                  |     |     |     |
 2:3:4 | 15 |    60 | 29 = 26 + 3          9‘    |   Δ200    |
-------+----+-------+----                  |     |     |     |
*2:3:5 | 16 |    70 | 30 = 26 + 4          |     |     |     |
-------+----+-------+----                  |     |     |     |
*2:4:6 | 17 |    80 | 31 = 26 + 5          |     |     |     |
-------+----+-------+----                  |     |     |     |
 2:4:7 |{18}|    90 | 32 = 26 + 6          |     |     |     |
-------+----+-------+----                  |     |     |     |
*2:4:8 |{19}|   100 | 36 = 26 + 10         |     |     |     |
=======+====+=======+====                 ===   ---   ---  ∆1000
*2:4:9 | 20 |   200 | 38 = 36 + log 10²          |     |     |
-------+----+-------+----                        |     |     |
 3:1:0 | 21 |   300 | 40 = 36 + 2 x log 10²      |     |     |
-------+----+-------+----                        |     |     |
 3:2:1 | 22 |   400 | 41 = 40 + 1                |     |     |
-------+----+-------+----                        |     |     |
*3:2:2 | 23 |   500 | 42 = 40 + 2                |     |     |
-------+----+-------+----                        |     |     |
*3:3:3 | 24 |   600 | 43 = 40 + 3                9"  Δ300    |
-------+----+-------+----                        |     |     |
 3:3:4 | 25 |   700 | 44 = 40 + 4                |     |     |
-------+----+-------+----                        |     |     |
*3:3:5 | 26 |   800 | 45 = 40 + 5                |     |     |
-------+----+-------+----                        |     |     |
*3:4:6 | 27 |   900 | 46 = 40 + 6                |     |     |
-------+----+-------+----                        |     |     |
 3:4:7 |{28}|  1000 | 50 = 40 + 10               |     |     |
=======+====+=======+====                       ===  ====    |
*3:4:8 |{29}|  2000 | 68 = 50 + 3 x (2x3)      {10³}   |     |
-------+----+-------+----                        Δ     |     |
 3:4:9 |{30}|  3000 |{71}= 68 + log 10³                |     |   
-------+----+-------+----                              |     |
 3:2:1 | 31 |  4000 | 72 = 71 + 1                      |     |
-------+----+-------+----                              |     |
*3:2:2 | 32 |  5000 | 73 = 71 + 2                      |     |
-------+----+-------+----                              |     |
*3:3:3 | 33 |  6000 | 74 = 71 + 3                    Δ400    |
-------+----+-------+----                              |     |
 3:3:4 | 34 |  7000 | 75 = 71 + 4                      |     |
-------+----+-------+----                              |     |
*3:3:5 | 35 |  8000 | 76 = 71 + 5                      |     |
-------+----+-------+----                              |     |
*3:4:6 | 36 |  9000 |{77}= 71 + 6                      |     |
-------+----+-------+----                              |     |
 3:4:7 |{37}| 10000 | 81 = 71 + 10 = 100 - 19          |     |
=======+====+=======+====                             ====  ----

32-5 = 27 = 9x3

Note

The four faces of our pyramid additively cascade 32 four-times triangular numbers (Note that 4 x 32 = 128 = the perimeter of the square base which has an area of 32^2 = 1024 = 2^10). These include Fibo1-3 equivalent 112 (rooted in T7 = 28; 28 x 4 = 112), which creates a pyramidion or capstone in our model, and 2112 (rooted in T32 = 528; 528 x 4 = 2112), which is the index number of the 1000th prime within our domain, and equals the total number of ‘elements’ used to construct the pyramid. (PrimesDemystified)

109 = 29th prime = ((10th)th prime)

    |-------------------------------- 2x96 ---------------------|
    |--------------- 7¤ ---------------|---------- 5¤ ----------|
✔️👉|- π(32(109²-89²))=109² -|-- {36} -|-------- {103} ---------|
    +----+----+----+----+----+----+----+----+----+----+----+----+
    |  5 |  7 | 11 |{13}| 17 | 19 | 17 |{12}| 11 | 19 | 18 |{43}|
    +----+----+----+----+----+----+----+----+----+----+----+----+
    |--------- {53} ---------|---- {48} ----|---- {48} ----|---👉109²-89² ✔️
    |---------- 5¤ ----------|------------ {96} -----------|-1¤-|
    |-------- Bosons --------|---------- Fermions ---------|-- Graviton
          13 variations               48 variations           11 variations

Parity Order

symmetry-09-00097-ag-550

Note

The origin of multiple generations of fermions, and the particular count of 3, is an unsolved problem of physics.

In standard quantum field theory, under certain assumptions, a single fermion field can give rise to multiple fermion poles with mass ratios of around eπ≈23 and e2π≈535 potentially explaining the large ratios of fermion masses between successive generations and their origin. (Wikipedia)

$True Prime Pairs:
(5,7), (11,13), (17,19)
 
layer | node | sub |  i  |  f.                                       MEC 30 / 2
------+------+-----+-----+------      ‹------------------------------ 0 {-1/2}
      |      |     |  1  | --------------------------
      |      |  1  +-----+                           |    
      |  1   |     |  2  | (5)                       |
      |      |-----+-----+                           |
      |      |     |  3  |                           |
  1   +------+  2  +-----+----                       |
      |      |     |  4  |                           |
      |      +-----+-----+                           |
      |  2   |     |  5  | (7)                       |
      |      |  3  +-----+                           |
      |      |     |  6  |                          11s ‹-- ∆28 = (71-43)
------+------+-----+-----+------      } (36)         |
      |      |     |  7  |                           |
      |      |  4  +-----+                           |
      |  3   |     |  8  | (11)               ∆9 ✔️  |
      |      +-----+-----+                    👆     |          Double
      |      |     |  9  | ∆9+∆(89-71)=∆27= { ∆9 ✔️  |‹--109² { Beta
  2   +------|  5* +-----+-----               👇     |          Decay
      |      |     |  10 |                    ∆9 ✔️  |
      |      |-----+-----+                           |
      |  4   |     |  11 | (13) --------------------- 
      |      |  6  +-----+            ‹------------------------------ 15 {0}
      |      |     |  12 |---------------------------
------+------+-----+-----+------------               |
      |      |     |  13 |                           |
      |      |  7  +-----+                           |
      |  5   |     |  14 | (17)                      |
      |      |-----+-----+                           |
      |      |     |  15 |                           7 x 24 = 168 √
  3*  +------+  8  +-----+-----       } (36)         |
      |      |     |  16 |                           |
      |      |-----+-----+                           |
      |  6   |     |  17 | (19)                      |
      |      |  9  +-----+                           |
      |      |     |  18 | -------------------------- 
------|------|-----+-----+-----  ‹----------------------------------- 30 {+1/2}

matrix-folding

Tabulate Prime by Power of 10
  loop(10) = π(10)-π(1) = 4-0 = 4
  loop(100) = π(100)-π(10)-1th = 25-4-2 = 19
  loop(1000) = π(1000) - π(100) - 10th = 168-25-29 = 114

  -----------------------+----+----+----+----+----+----+----+----+----+-----
   True Prime Pairs Δ    |  1 |  2 |  3 |  4 |  5 |  6 |  7 |  8 |  9 | Sum 
  =======================+====+====+====+====+====+====+====+====+====+=====
   19 → π(10)            |  2 |  3 |  5 |  7 |  - |  - |  - |  - |  - | 4th  4 x Root
  -----------------------+----+----+----+----+----+----+----+----+----+-----
   17 → π(20)            | 11 | 13 | 17 | 19 |  - |  - |  - |  - |  - | 8th  4 x Twin
  -----------------------+----+----+----+----+----+----+----+----+----+-----
   13 → π(30) → 12 (Δ1)  | 23 | 29 |  - |  - |  - |  - |  - |  - |  - |10th
  =======================+====+====+====+====+====+====+====+====+====+===== 1st Twin
   11 → π(42)            | 31 | 37 | 41 |  - |  - |  - |  - |  - |  - |13th
  -----------------------+----+----+----+----+----+----+----+----+----+----- 2nd Twin
    7 → π(60) → 19 (Δ12) | 43 | 47 | 53 | 59 |  - |  - |  - |  - |  - |17th
  -----------------------+----+----+----+----+----+----+----+----+----+----- 3rd Twin
    5 → π(72) → 18 (Δ13) | 61 | 67 | 71 |  - |  - |  - |  - |  - |  - |20th
  =======================+====+====+====+====+====+====+====+====+====+===== 4th Twin
    3,2 → 18+13+12 → 43  | 73 | 79 | 83 | 89 | 97 | 101| 103| 107| 109|29th 
  =======================+====+====+====+====+====+====+====+====+====+=====
           Δ                                                            Δ
  12+13+(18+18)+13+12   ← 36th-Δ1=151-1=150=100+2x(13+12)   ←   30th = 113 = 114-1

Sequence:
 By the next layer the 89² will become 89 and 5 become 5² or 25.
 This 89 and 25 are in the same layer with total of 114 or prime 619
 So sequence from the first prime is 1,4,7,10,29,68,89,114,139,168,329,618.
Note

Using Euler’s method to find p(40): A ruler with plus and minus signs (grey box) is slid downwards, the relevant terms added or subtracted. The positions of the signs are given by differences of alternating natural (blue) and odd (orange) numbers. In the SVG file, hover over the image to move the ruler (Wikipedia).

π(π(π(1000th prime))) + 1 = 40

image

Distribution Order

1st layer:
It has a total of 1000 numbers
Total primes = π(1000) = 168 primes

2nd layer:
It will start by π(168)+1 as the 40th prime
It has 100x100 numbers or π(π(10000)) = 201 primes
Total cum primes = 168 + (201-40) = 168+161 = 329 primes

3rd layer:
Behave reversal to 2nd layer which has a total of 329 primes
The primes will start by π(π(π(1000th prime)))+1 as the 40th prime
This 1000 primes will become 1000 numbers by 1st layer of the next level
Total of all primes = 329 + (329-40) = 329+289 = 618 = 619-1 = 619 primes - Δ1 

96 perfect squares

Plottng 40th prime scheme of the three (3) layers with all the features of 3rd prime identity as explained above then they would form their recycling .

89^2 - 1 = 7920 = 22 x 360 = 66 x 120 = (168 - 102) x 120

  Fermion  | spinors | charged | neutrinos |   quark   | components | parameter
   Field   |   (s)   |   (c)   |    (n)    | (q=s.c.n) |  Σ(c+n+q   | (complex)
===========+=========+=========+===========+===========+============+===========
bispinor-1 |    2    |    3    |     3     |    18     |     24     |   19
-----------+---------+---------+-----------+-----------+------------+-- 17
bispinor-2 |    2    |    3    |     3     |    18     |     24     |   i12 ✔️
===========+=========+=========+===========+===========+============+===========
bispinor-3 |    2    |    3    |     3     |    18     |     24     |   11
-----------+---------+---------+-----------+-----------+------------+-- 19
bispinor-4 |    2    |    3    |     3     |    18     |     24     |   i18 ✔️
===========+=========+=========+===========+===========+============+===========
  SubTotal |    8    |   12    |    12     |    72     |     96     |   66+i30
===========+=========+=========+===========+===========+============+===========
majorana-1 |   2x2   |    -    |    18     |     -     |     18     |   18 ✔️
-----------+---------+---------+-----------+-----------+------------+-----------
majorana-2 |   2x2   |    -    |    12     |     -     |     12     |   12 ✔️
-----------+---------+---------+-----------+-----------+------------+-----------
majorana-3 |   2x2   |    -    |    13     |     -     |     13     |   i13
===========+=========+=========+===========+===========+============+===========
  SubTotal |    12   |    -    |    43     |     -     |     43     |  30+i13
===========+=========+=========+===========+===========+============+===========
     Total |    20   |   12    |    55     |    72     |    139     |  96+i43 ✔️

223622800-4602ad28-1622-4742-821e-d702c0fc8303