Extremal unitary representations of big N=4 superconformal algebra
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In this paper we give a detailed proof of the classification of extremal (=massless) unitary highest weight representations in the Neveu Schwarz and Ramond sectors of the big $N=4$ superconformal algebra which can be found in [5]. Our results agree with the general conjectures about classification of unitary highest weight representation of minimal $W$-algebras attached to basic Lie superalgebras formulated in [10], [11], and complete their proof for the big $N=4$ superconformal algebra.
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Cited by 2 Pith papers
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Determines the Zhu algebras of N=1,2,3,4 and big N=4 superconformal vertex algebras and introduces Zhu algebras for N_K=N supersymmetric vertex algebras via Huang's definition for arbitrary vertex algebras.
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Spectral flow yields a proof of unitarity for Ramond twisted non-extremal representations of unitary minimal W-algebras, independent of the conjectural exactness of twisted quantum reduction, plus equivalence results ...
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