摘要
Let L be a Lie algebra of Block type over C with basis {Lα,i | a,i ∈ Z} and brackets [Lα,i, Lβ,j] = (β(i + 1) - α(j + 1))Lα+β,i+j. In this paper, we first construct a formal distribution Lie algebra of L. Then we decide its conformal algebra B with C[δ]- basis { Lα(w) | α ∈ Z} and λ-brackets [Lα(w)λLβ(w)] = (αδ + (α +β)A)Lα+β(w). Finally, we give a classification of free intermediate series B-modules.
Let L be a Lie algebra of Block type over C with basis {Lα,i | a,i ∈ Z} and brackets [Lα,i, Lβ,j] = (β(i + 1) - α(j + 1))Lα+β,i+j. In this paper, we first construct a formal distribution Lie algebra of L. Then we decide its conformal algebra B with C[δ]- basis { Lα(w) | α ∈ Z} and λ-brackets [Lα(w)λLβ(w)] = (αδ + (α +β)A)Lα+β(w). Finally, we give a classification of free intermediate series B-modules.
