State[ment]vetse – state – 1

If GOD is Complete, GOD is inconsistent. If GOD is incomplete but consistent, GOD is Not GOD.

The GOD, The Absolute:

1). Every statement has ‘Not’ or ‘Not-statement’.

2). Any statement A is a ‘Not’ or Not-statement of any ‘other’ statement B. (So any B or C or statement is just Not-A, or NA in short)

Any A is the Contradiction of B, the ‘Not’ of A, i.e. NA.

CONTRADICTION is the KEY

This is what actually leads to, and this is why, and this is the reason why Gödel’s incompleteness theorem exists. This is the fundamental that actually is the reason for things like Gödel’s incompleteness. This is more fundamental than the incompleteness theorem, or incompleteness. This can be restated as stating that: there is no Absolute. The Absolute is No-Absolute. The Absolute is Absolute-No-Absolute. The absolute is Nothing. The Absolute is EVERYTHING. The Absolute is NOTHING = EVERYTHING. The Absolute is CONTRADICTION. The Absolute is Infidefiception. The Absolute is State[ment]verse.

Here are Gödel’s incompleteness theorem. These are mathematical theorems that relate to the philosophy in mathematics and to mathematical logic.

First Incompleteness Theorem: “Any consistent formal system F within which a certain amount of elementary arithmetic can be carried out is incomplete; i.e., there are statements of the language of F which can neither be proved nor disproved in F.” (Raatikainen 2015)

                                     Gödel’s 1st Incompleteness theorem

Second Incompleteness Theorem: “Assume F is a consistent formalized system which contains elementary arithmetic. Then {\displaystyle F\not \vdash {\text{Cons}}(F)}.” (Raatikainen 2015)

                                     Gödel’s 2nd Incompleteness theorem

                                     Gödel’s 2nd Incompleteness theorem

Therefore, ‘GOD’ cannot be complete without being inconsistent or contradictory. GOD cannot be GOD, without CONTRADICTION.