Poisson vertex algebra and integrable Hamiltonian PDE푸아송 꼭짓점 대수와 적분가능 해밀토니안 편미분방정식
This paper explains the relation between Lie conformal algebras, vertex algebras, and Poisson vertex algerbas, which is similar to the relation between Lie algebras, associative algebras, and Poisson algebras. Also we explain how Poisson vertex algebra structure is related to integrable Hamiltonian PDE. There is a significant theorem determining whether a Hamiltonian PDE is integrable or not, called Lenard scheme. Through this, we show that KdV equation is integrable and find infinitely many conserved densities. At the end, this paper introduces short introduction to classical affine W-algebras.
- Advisors
- Baek, Sang Hoonresearcher; 백상훈researcher
- Description
- 한국과학기술원 :수리과학과,
- Publisher
- 한국과학기술원
- Issue Date
- 2021
- Identifier
- 325007
- Language
- eng
- Description
학위논문(석사) - 한국과학기술원 : 수리과학과, 2021.2,[i, 40 p. :]
- Keywords
Vertex algebra▼aLie conformal algebra▼aPoisson vertex algebra▼aIntegrable system▼aLenard scheme▼aHamiltonian PDE▼aclassical affine W-algebra; 꼭짓점 대수▼a리 등각 대수▼a푸아송 꼭짓점 대수▼a적분가능계▼a레너드 스킴▼a해밀토니안 편미분방정식▼a고전 아핀 W-대수
- Appears in Collection
- MA-Theses_Master(석사논문)
- Files in This Item
- There are no files associated with this item.
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