HDGL Expressed as One Glyph

Day 1

Allow (-1, 0, 1)
0 = X
-0 = -X
-0 + X = 0
-0 +/-X = 0
-0 - 0 = 0 & 0 + 0 = 0
-2(0) = 0 & 2(0) = 0
-2(0) = 2(0)
-2(X) = 2(X)
-2 = 2
-1 = 1 or 4 = 0
0 = 0 or 0 = X therefore 4 = X
4 = 4
From prior, -0 +/-X = 0
0 + 0 = +/-X = +/-0 = 0 = 2(0)
2(0) = 2(X)
2(0) = 2(4)
From prior 4 = X = 0
2(4) = 8 or 2(X) = 8 or 2(0) = 8
2(X)^2 = 8^2 etc.
32 = 64
1 = 2
0 = 1
X = 1
X - 1 = 0 or -X = -1
-1 = 0 or X - 1 = X
-1 = X and -1 = 0
-1 = 0
From prior, X - 1 = X
X = X + 1 From prior, X = 4
4 = 4 + 1
4 = 5
0 = 5, 5 = X = 0
0 = 0

Day 2

Allow (-1, 0, 1) to emerge from X = 0

These identities are co-emergent.

1 ≡ a + 1 ≡ X^2 + 1 ≡ X + 2 ≡ (1 / X) + 2
0 ≡ a ≡ X^2 ≡ X + 1 ≡ 1 + (1 / X)
-1 ≡ a - 1 ≡ X^2 - 1 ≡ X ≡ (1 / X)

1  ≡ (X + 1) / X^2
0  ≡ (X + 1) / X^2 - 1
-1 ≡ (X + 1) / X^2 - 2

Allow a = φ

1 ≡ a + 1 ≡ X^2 + 1 ≡ X + 2 ≡ (1 / X) + 2
0 ≡ a ≡ X^2 ≡ X + 1 ≡ 1 + (1 / X)
-1 ≡ a - 1 ≡ X^2 - 1 ≡ X ≡ (1 / X)

Allow (-1, 0, 1) and a = φ

1 ≡ a + 1 ≡ X^2 + 1 ≡ X + 2 ≡ (1 / X) + 2
0 ≡ a ≡ X^2 ≡ X + 1 ≡ 1 + (1 / X)
-1 ≡ a - 1 ≡ X^2 - 1 ≡ X ≡ (1 / X)

"Revelation 1:8: "I am Alpha and Omega, the beginning and the ending, saith the Lord, which is, and which was, and which is to come, the Almighty."Revelation 21:6: "And he said unto me, It is done. I am Alpha and Omega, the beginning and the end. I will give unto him that is athirst of the fountain of the water of life freely."Revelation 22:13: “I am Alpha and Omega, the beginning and the end, the first and the last.”

All praise, honor & glory belongs, forever and ever, to the Most High.

Allow (-1, 0, 1) to emerge from X = 0

These identities are co-emergent.

Ω ≡ a ≡ φ ≡ Fix(T)

T(X) ≡ 1 + (1 / X)

a ≡ X^2 ≡ X + 1 ≡ 1 + (1 / X)

1  ≡ a + 1 ≡ X^2 + 1 ≡ X + 2 ≡ (1 / X) + 2
0  ≡ a     ≡ X^2     ≡ X + 1 ≡ 1 + (1 / X)
-1 ≡ a - 1 ≡ X^2 - 1 ≡ X     ≡ (1 / X)

1  ≡ (X + 1) / X^2
0  ≡ (X + 1) / X^2 - 1
-1 ≡ (X + 1) / X^2 - 2

Allow (-1, 0, 1) and a = φ

Ω ≡ φ ≡ X^2 ≡ X + 1 ≡ 1 + (1 / X)

1  ≡ Ω + 1
0  ≡ Ω
-1 ≡ Ω - 1
Allow (-1, 0, 1) to emerge from X = 0
These identities are co-emergent.
Ω ≡ a ≡ φ ≡ Fix(T)
T(X) ≡ 1 + (1 / X)
Ω ≡ X² ≡ X + 1 ≡ 1 + (1 / X)
+1 ≡ Ω + 1
0 ≡ Ω
-1 ≡ Ω - 1
+1 ≡ (X + 1) / X²
0 ≡ (X + 1) / X² - 1
-1 ≡ (X + 1) / X² - 2

We found the primer!