Noncommutative theories and general coordinate transformations
Abstract
We study the class of noncommutative theories in d dimensions whose spatial coordinates (xi)i=1d can be obtained by performing a smooth change of variables on (yi)i=1d, the coordinates of a standard noncommutative theory, which satisfy the relation [yi, yj] = i θij, with a constant θij tensor. The xi variables verify a commutation relation which is, in general, space-dependent. We study the main properties of this special kind of noncommutative theory and show explicitly that, in two dimensions, any theory with a space-dependent commutation relation can be mapped to another where that θij is constant.
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