Position-dependent noncommutative products: classical construction and field theory
Abstract
We look in Euclidean R4 for associative star products realizing the commutation relation [xμ,x]=iμ(x), where the noncommutativity parameters μ depend on the position coordinates x. We do this by adopting Rieffel's deformation theory (originally formulated for constant and which includes the Moyal product as a particular case) and find that, for a topology R2 × R2, there is only one class of such products which are associative. It corresponds to a noncommutativity matrix whose canonical form has components 12=-21=0 and 34=-43= θ(x1,x2), with (x1,x2) an arbitrary positive smooth bounded function. In Minkowski space-time, this describes a position-dependent space-like or magnetic noncommutativity. We show how to generalize our construction to n≥ 3 arbitrary dimensions and use it to find traveling noncommutative lumps generalizing noncommutative solitons discussed in the literature. Next we consider Euclidean λφ4 field theory on such a noncommutative background. Using a zeta-like regulator, the covariant perturbation method and working in configuration space, we explicitly compute the UV singularities. We find that, while the two-point UV divergences are non-local, the four-point UV divergences are local, in accordance with recent results for constant .
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