For WITTGENSTEIN Ludwig Revised with Symplectic Language Theory and Floer Homology Language
For WITTGENSTEIN Ludwig Revised
Position of Language
TANAKA Akio
1 Quantization 1 is a cliff for consideration of language.
2 Mathematical interpretation of quantized language is now a first step to the theoretical ascent.
3 If there is not mathematics, next conjectures are impossible.
(i) Difference between word and sentence--- Commutative and noncommutative ring
(ii) Continuation from word to sentence--- Tomita’s fundamental theorem
(iii) Word’s finiteness and sentence’s infinity--- Property infinite and purely infinite
(iv) Cyclic structure of word’s meaning--- Infinite cyclic group
4 Meaning minimum 2 , mirror language 3 and mirror symmetry 4 are inevitable approach to the study of language especially for language universals 5 .
5 Symplectic Language Theory, Floer Homology Language and Arithmetic Geometry Language are adopted as the model theory for natural language in the recent.
6 Hereinafter the model theory will be entered to the new concept . The Model s of Language Universals 6 will be shown by the description of mathematics.
[References]
0 . WITTGENSTEIN Ludwig
Theory Dictionary Writing
Theory Dictionary Person
Aim for Frame-Quantum Theory
1 . Quantized Language
Quantization of Language /Floer Homology Language
2 . Meaning minimum
Structure of Meaning / Symplectic Language Theory
3 . Mirror language
Mirror Symmetry on Rational Curve / Symplectic Language Theory
4 . Mirror symmetry
Homology Mirror Symmetry Conjecture by KONTSEVICH / Symplectic Language Theory
5 . Language universals
Generating Function / Symplectic Language Theory
6. Models of Language Universals
Language Universal Models
Tokyo December 10, 2005
Tokyo November 27, 2008 Revised
Tokyo March 24, 2009 Revised
Tokyo June 27, 2009 Revised
Tokyo February 28, 2011 Revised
Tokyo August 3, 2012 Revised
Tokyo December 8, 2014 Reprinted
SIL
# Revised Edition ends here.
..................................................................................................................................................
Symplectic Language Theory
..................................................................................................................................................
Floer Homology Language
..................................................................................................................................................
Position of Language
TANAKA Akio
1 Quantization 1 is a cliff for consideration of language.
2 Mathematical interpretation of quantized language is now a first step to the theoretical ascent.
3 If there is not mathematics, next conjectures are impossible.
(i) Difference between word and sentence--- Commutative and noncommutative ring
(ii) Continuation from word to sentence--- Tomita’s fundamental theorem
(iii) Word’s finiteness and sentence’s infinity--- Property infinite and purely infinite
(iv) Cyclic structure of word’s meaning--- Infinite cyclic group
4 Meaning minimum 2 , mirror language 3 and mirror symmetry 4 are inevitable approach to the study of language especially for language universals 5 .
5 Symplectic Language Theory, Floer Homology Language and Arithmetic Geometry Language are adopted as the model theory for natural language in the recent.
6 Hereinafter the model theory will be entered to the new concept . The Model s of Language Universals 6 will be shown by the description of mathematics.
[References]
0 . WITTGENSTEIN Ludwig
Theory Dictionary Writing
Theory Dictionary Person
Aim for Frame-Quantum Theory
1 . Quantized Language
Quantization of Language /Floer Homology Language
2 . Meaning minimum
Structure of Meaning / Symplectic Language Theory
3 . Mirror language
Mirror Symmetry on Rational Curve / Symplectic Language Theory
4 . Mirror symmetry
Homology Mirror Symmetry Conjecture by KONTSEVICH / Symplectic Language Theory
5 . Language universals
Generating Function / Symplectic Language Theory
6. Models of Language Universals
Language Universal Models
Tokyo December 10, 2005
Tokyo November 27, 2008 Revised
Tokyo March 24, 2009 Revised
Tokyo June 27, 2009 Revised
Tokyo February 28, 2011 Revised
Tokyo August 3, 2012 Revised
Tokyo December 8, 2014 Reprinted
SIL
# Revised Edition ends here.
..................................................................................................................................................
Symplectic Language Theory
- Symplectic Topological Existence Theorem
- Gromov-Witten Invariantational Curve
- Mirror Symmetry Conjecture on Rational Curve
- Isomorphism of Map Sequence
- Homological Mirror Symmetry Conjecture by KONTSEVICH
- Structure of Meaning
- Dialogue: On structure
..................................................................................................................................................
Floer Homology Language
- Potential of Language
- Supersymmetric Harmonic Oscillator
- Grothendieck Group
- Reversibility of language
- Homology Generation of Language
- Homology Structure of word
- Quantization of Language
- Discreteness of Language
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Original texts of
Symplectic language Theory and Floer Homology Language
are all shown at Zoho Group [2009]of Table in this site.
Tokyo
11 December 2015
Sekinan Study