Gravity, Non-Commutative Geometry and the Wodzicki Residue

Abstract

We derive an action for gravity in the framework of non-commutative geometry by using the Wodzicki residue. We prove that for a Dirac operator D on an n dimensional compact Riemannian manifold with n≥ 4, n even, the Wodzicki residue Res(D-n+2) is the integral of the second coefficient of the heat kernel expansion of D2. We use this result to derive a gravity action for commutative geometry which is the usual Einstein Hilbert action and we also apply our results to a non-commutative extension which, is given by the tensor product of the algebra of smooth functions on a manifold and a finite dimensional matrix algebra. In this case we obtain gravity with a cosmological constant.

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