Thursday, 19 May 2022

Quantum space through Poisson manifold’s deformation quantization by Kontsevich. Translated by Google translate

 

Quantum space through Poisson manifold’s deformation quantization by Kontsevich. Translated by Google translate

Quantum space through Poisson manifold’s deformation quantization by Kontsevich

TANAKA Akio

From  Print  2012, Chapter 18

Symmetry. That’s what I used to talk to repeatedly. Prague in the 1920s. Kartsevsky’s article in the magazine TCLP, “Asymmetric duality of linguistic symbols”. The coexistence of absolutely contradictory soft and hard structures that the language continues to hold, and thus the language continues to be a language.

An eternal contradiction that will remain doubly implicit in the language. Karcevskij presented the duality, which is why the language can be so flexible and so rigid that it is almost absolutely contradictory. A white-eyed discussion left by Sergey Kartsevsky, a linguist who C was the only genius in its last book.

A consistent understanding of this duality, why this coexistence is possible, is probably still not submitted. In comparison, steady progress has been made in the world of quantization.

According to Fukaya, Konzevic presented his formal conjecture in his 1997 paper, and he proved it by himself in the 2003 paper. “Modified quantization of Poisson manifolds”. Fukaya in his book outlines the proof only for the n R case. The whole proof is immeasurable. Space by quantum, that may not be a dream anymore.

Source: Tale / Print by LI Koh / 27 January 2012

Reference:

Quantization of Language / 24 June 2009

Tokyo

4 June 2015

Sekinan Library

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