Levi-Civita connections for conformally deformed metrics on tame differential calculi

Abstract

Given a tame differential calculus over a noncommutative algebra A and an A-bilinear pseudo-Riemannian metric g0, consider the conformal deformation g = k. g0, k being an invertible element of A.We prove that there exists a unique connection ∇ on the bimodule of one-forms of the differential calculus which is torsionless and compatible with g. We derive a concrete formula connecting ∇ and the Levi-Civita connection for the pseudo-Riemannian metric g0. As an application, we compute the Ricci and scalar curvature for a general conformal perturbation of the canonical metric on the noncommutative 2-torus as well as for a natural metric on the quantum Heisenberg manifold. For the latter, the scalar curvature turns out to be a negative constant.

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