Filtered Lie conformal algebras whose associated graded algebras are   isomorphic to that of general conformal algebra $gc_1$

Yucai Su; Xiaoqing Yue

arXiv:1107.0770·math.QA·July 6, 2011·2 cites

Filtered Lie conformal algebras whose associated graded algebras are isomorphic to that of general conformal algebra $gc_1$

Yucai Su, Xiaoqing Yue

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Abstract

Let $G$ be a filtered Lie conformal algebra whose associated graded conformal algebra is isomorphic to that of general conformal algebra $g c_{1}$ . In this paper, we prove that $G ≅ g c_{1}$ or $gr g c_{1}$ (the associated graded conformal algebra of $g c_{1}$ ), by making use of some results on the second cohomology groups of the conformal algebra $\fg$ with coefficients in its module $M_{b, 0}$ of rank 1, where $\fg = \Vir ⋉ M_{a, 0}$ is the semi-direct sum of the Virasoro conformal algebra $\Vir$ with its module $M_{a, 0}$ . Furthermore, we prove that $gr g c_{1}$ does not have a nontrivial representation on a finite $\C [\partial]$ -module, this provides an example of a finitely freely generated simple Lie conformal algebra of linear growth that cannot be embedded into the general conformal algebra $g c_{N}$ for any $N$ .

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TopicsAlgebraic structures and combinatorial models · Advanced Topics in Algebra · Nonlinear Waves and Solitons