Abstract
This paper studies certain relations among vertex algebras, vertex Lie algebras and vertex Poisson algebras. In this paper, the notions of vertex Lie algebra (conformal algebra) and vertex Poisson algebra are revisited and certain general construction theorems of vertex Poisson algebras are given. A notion of filtered vertex algebra is formulated in terms of a notion of good nitration and it is proved that the associated graded vector space of a filtered vertex algebra is naturally a vertex Poisson algebra. For any vertex algebra V, a general construction and a classification of good filtrations are given. To each ℕ-graded vertex algebra V = ∐n∈ℕ V (n) with V(0) = ℂ1, a canonical (good) filtration is associated and certain results about generating subspaces of certain types of V are also obtained. Furthermore, a notion of formal deformation of a vertex (Poisson) algebra is formulated and a formal deformation of vertex Poisson algebras associated with vertex Lie algebras is constructed.
Original language | English (US) |
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Pages (from-to) | 61-110 |
Number of pages | 50 |
Journal | Communications in Contemporary Mathematics |
Volume | 6 |
Issue number | 1 |
DOIs | |
State | Published - Feb 2004 |
All Science Journal Classification (ASJC) codes
- General Mathematics
- Applied Mathematics
Keywords
- Good filtration
- Vertex Lie algebra
- Vertex Poisson algebra
- Vertex algebra