An operator algebraic characterization of the Riemannian vacuum Einstein equation in four dimensions

Abstract

In this paper, using connected compact oriented smooth 4-manifolds, some representations of the hyperfinite II1-type factor von Neumann algebra are constructed. The Murray--von Neumann coupling constant of these representations gives rise to a new smooth 4-manifold invariant whose very first properties are investigated. Moreover as a part of this construction, a connected compact oriented smooth 4-manifold admits an embedding into the hyperfinite II1 factor. This embedding, on the one hand, induces a Riemannian metric on the manifold such that its Riemannian curvature tensor belongs to the von Neumann algebra; on the other hand the metric induces a periodic dynamics on the von Neumann algebra, what we call the Hodge dynamics on the hyperfinite II1 factor. It is observed that the metric is Einstein i.e., satisfies the (Riemannian) vacuum Einstein equation with a possibly non-zero cosmological constant, if and only if its Riemannian curvature tensor belongs to the fixed-point-subalgebra of the Hodge dynamics. Finally, we make a comprehensive enumeration of all representations of the hyperfinite II1 factor constructed here, from the viewpoint of thermal equilibrium states and phase transitions in algebraic quantum field theory.