Noncommutative field theory on R3λ
Abstract
We consider the noncommutative space R3λ, a deformation of the algebra of functions on R3 which yields a foliation of R3 into fuzzy spheres. We first review the construction of a natural matrix basis adapted to R3λ. We thus consider the problem of defining a new Laplacian operator for the deformed algebra. We propose an operator which is not of Jacobi type. The implication for field theory of the new Laplacian is briefly discussed.
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