Floer Homology Language
TANAKA Akio
Note 1
Potential of Language
¶ Prerequisite conditions
Note 6 Homology structure of Word
1
(Definition)
(Gromov-Witten potential)
2
(Theorem)
(Witten-Dijkggraaf-Verlinde-Verlinde equation)
3
(Theorem)
(Structure of Frobenius manifold)
Symplectic manifold (M, wM)
Poincaré duality < . , . >
Product <V1 V2, V3> = V1V2V3( )
(M, wM) has structure of Frobenius manifold over convergent domain of Gromov-Witten potential.
4
(Theorem)
Mk,β (Q1, …, Qk) =
N(β) expresses Gromov-Witten potential.
[Image]
When Mk,β (Q1, …, Qk) is identified with language, language has potential N(β).
[Reference]
Quantum Theory for language / Synopsis / Tokyo January 15, 2004
First designed on
Tokyo April 29, 2009
Newly planned on further visibility
Tokyo June 16, 2009
Sekinan Research Field of Language
[Note, 31 March 2015]
This paper was first designed for energy of language. But at that time, I could not write
the proper approach from the concept of energy by mathematical process. So I wrote
the paper through the concept of potential. Probably energy is one of the most fundamental
factors on language.
In 2003 I wrote Quantum Theory for Language , before which I wrote the manuscript focusing
the concept of quantum abstracted from the ideogram of classical Chinese written language.
The last target of manuscript was energy and meaning of quantum that was the ultimate
unit of language.
Refer to the next.
Read more: https://srfl-paper.webnode.com/news/basis-of-study-sekinan-view-june-2015/
[Note 2, 30 November 2017]
Now the study on image analysis has been studied using geometrization from the side of ideogram that has vast heritage in history of Orient. Potential of language seems to be the strong basis for this image analysis.
Tokyo
30 November 2017
Geometrization Language
No comments:
Post a Comment