Derived Category Language 3

25/05/2016 20:37

Derived Category Language 3

Language stability and triangulated category

[Epitome]

T. Bridgeland defined stability conditions on triangulated categories in 2007.
Language's stability presented by Sergej Karcevskij in 1928.
Bridgeland's stability seems to hint for  Karcevskij's stability.

Stability conditions on triangulated categoriesData ( Z, A ) satisfies the next condition.

  is bounded kernel of t-structure. gives stability condition on A .

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2.
[Paper on Karcevskij conjecture by TANAKA Akio 2011]

Notes for KARCEVSKIJ Sergej

Condition of Meaning
TANAKA Akio
September 11, 2011

[Preparation]

Graded differential algebra

Minimal model of graded differential algebra

Degree of homogenious element x of graded differential algabra |x|

Basis of linear space is given by homogenious and elements x₁, ....., x_n

N  (V) =  L (V) _k  = N  ( x ₁ , .....,  x _n  )

Operation of minimal model

Spherical surface Sⁿ, n≥2

de Rham complex *(Sⁿ)

When n iseaven number,

Volume element of S_n

M_n = Λ (x), |x| = n, dx = 0,

,

M_2n-1 gives minimal model S_n to de Rham complex .

When n is odd number,

M_n gives minimal model S_n to de Rham complex .

[Interpretation]

Word is given by spherical surface.

Meaning of word is given by elements x₁, ....., x_n.

Word has minimal model.

Word becomes formal.

Fundamental group of word contains free group of rank b₁(M).

Here KARCEVSKIJ's "stable part" is identified to fundamental group and " mobile part" is identified to free group.

Refer to the paper  Notes for KARVESKIJ Sergej "asymmetric Dusualisme the linguistic sign"  .

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3.
[Paper on description of language by TANAKA Akio 2011]

Notes for KARCEVSKIJ Sergej

Description of Language
TANAKA Akio
September 9, 2011

Manifold M

Cup product map of M

Dual map of  

Free Lie algebra that  generates £ ( )

 is identified as the partial space of £(  ) that quadrastic Lie bracket of  generates.

Ideal of £(  ) that Im η generates a 

Holonomy Lie algebra of M 

Completion of holonomy Lie algebra

If M has quadrastic homology connection, Malcev completion  becomes isomorphic with holonoly Lie algebra completion  .

Primary minimum model M(1)of differential manifold M is isomorphic with Malcev completion of  of M's fundamental group.

For the description of a language model there is a need primary minimum model M(1) of differential manifold M.

This paper has been published by Sekinan Research Field of Language.
All rights reserved.
© 2011 by The Sekinan Research Field of Language

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4.

[Note]

If word satisfies Bridgeland 2002's Data{Z, A] , word has a stability in language.

For the problem of additional meaning refer to Karcevskij conjecture 1928 and Kawamata conjecture 2002.

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#This paper is unfinished

Tokyo
25 May 2016
SRFL Theory

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