Scaling limit of N=6 superconformal Chern-Simons theories and Lorentzian Bagger-Lambert theories

Abstract

We show that the N=8 superconformal Bagger-Lambert theory based on the Lorentzian 3-algebra can be derived by taking a certain scaling limit of the recently proposed N=6 superconformal U(N)xU(N) Chern-Simons-matter theories at level (k, -k). The scaling limit (and Inonu-Wigner contraction) is to scale the trace part of the bifundamental fields as X0 -> λ-1 X0 and an axial combination of the two gauge fields as Bμ -> λ Bμ. Simultaneously we scale the level as k -> λ-1 k and then take λ -> 0 limit. Interestingly the same constraint equation ∂2 X0=0 is derived by imposing finiteness of the action. In this scaling limit, M2-branes are located far from the origin of C4/Zk compared to their fluctuations and Zk identification becomes a circle identification. Hence the scaled theory describes N=8 supersymmetric theory of 2-branes with dynamical coupling. The coupling constant is promoted to a space-time dependent SO(8) vector X0I and we show that the scaled theory has a generalized conformal symmetry as well as manifest SO(8) with the transformation of the background fields X0I.