Geometrical Tools for Quantum Euclidean Spaces

Abstract

We apply one of the formalisms of noncommutative geometry to RNq, the quantum space covariant under the quantum group SOq(N). Over RNq there are two SOq(N)-covariant differential calculi. For each we find a frame, a metric and two torsion-free covariant derivatives which are metric compatible up to a conformal factor and which have a vanishing linear curvature. This generalizes results found in a previous article for the case of R3q. As in the case N=3, one has to slightly enlarge the algebra RNq; for N odd one needs only one new generator whereas for N even one needs two. As in the particular case N=3 there is a conformal ambiguity in the natural metrics on the differential calculi over RNq. While in our previous article the frame was found `by hand', here we disclose the crucial role of the quantum group covariance and exploit it in the construction. As an intermediate step, we find a homomorphism from the cross product of RNq with Uqso(N) into RNq, an interesting result in itself.

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