The N=4 Supersymmetric Linear W∞[λ] Algebra
Abstract
From the recently known N=2 supersymmetric linear W∞K,K[λ] algebra where K is the dimension of fundamental (or antifundamental) representation of bifundamental β \, γ and b \, c ghost system, we determine its N=4 supersymmetric enhancement at K=2. We construct the N=4 stress energy tensor, the first N=4 multiplet and their operator product expansions (OPEs) in terms of above bifundamentals. We show that the OPEs between the first N=4 multiplet and itself are the same as the corresponding ones in the N=4 coset SU(N+2)SU(N) model under the large (N,k) 't Hooft-like limit with fixed λco (N+1)(k+N+2), up to two central terms. The two parameters are related to each other λ =12\, λco. We also provide other OPEs by considering the second, the third and the fourth N=4 multiplets in the N=4 supersymmetric linear W∞[λ] algebra.
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