Wednesday, 3 January 2018

Reversion Conjecture Revised

Reversion Conjecture Revised

TANAKA Akio


Simplification of Reversion conjecture

Reversion conjecture is simplified by Kerz-Saito's theorem, 2012.
Kerz, M., Saito, S.: Cohomological Hasse principle and motivic cohomology of arithmetic schemes. 2012
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Interpretation of Reversion conjecture
According to Reversion conjecture, language has a standstill point in itself.
Here it means that every word has standstill point and every word has a proper distance from the standstill point. This distance constructs word's proper meaning and grammar.


Refer to the next.
Distance Theory 2004 / SRFL 2004
Reversion Theory 2004 / SRFL 2004

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New starting point on language, Reversion conjecture
Reversion conjecture may become the new starting point on language, especially on language universals.
Reversion conjecture has the preparatory thinking by algebraic geometry.
Refer to the next.


Dimension Decrease Conjecture 2013 
Synthesis Conjecture 2013
Reversion Conjecture 2013

For more details, see the next.
sekinanfresh / SRFL Sekinan Research Field of Language

[Here ends the revised part of the conjecture dated at 1 May 2014.]
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[The next is the first issued version of Reversion Conjecture dated at 14 October 2013.]

Reversion Conjecture
Reversion Conjecture
Conjecture for reversion of language

Conjecture for reversion of language
14/10/2013 11:21
Conjecture for reversion of language
Language has a standstill point in itself.

[Explanation]
This conjecture’s intuition is prepared at the paper, Reversion Theory 2004 at Sekinan Research Field of Language.
This conjecture’s mathematical basis is given by Kato conjecture 1986. The conjecture is said to be given cohomological Hasse principle at unramified number theory.

[References]
News. hillssouthroad
News
Reversion Theory 2004
14/10/2013 11:10
Kato conjecture 1986
13/10/2013 23:07
K. KATO, 1986
12/10/2013 19:52

Tokyo
1 May 2014

20 May 2014, Revised

                                                               Sekinan Research Field of Language

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