Three Families of Lie Algebras of Exponential Growth from Vertex Operator Algebras
Abstract
We study three families of infinite-dimensional Lie algebras defined from Vertex Operator Algebras and their properties. For N=0 VOAs, we review the construction of the Fock space VL from an even lattice L and provide an algebraic description of the Lie algebra gII25,1 from the perspective of 24 different Niemeier lattices N via the decomposition II25,1 = N II1,1 using the no-ghost theorem. For N=1 SVOAs we review the construction of the Fock space VNS and provide an explicit basis for the spectrum-generating algebra of the Lie algebra gNS. For N=2 SVOAs, we describe the structure of g(2)NS explicitly as a Q-graded Lie algebra and we lift a left and right SL(2,Z) action on II2,2 to g(2)NS.
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