Emergent Time in Hamiltonian General Relativity

Abstract

In this paper we introduce a definition of time that emerges in terms of the geometry of the configuration space of a dynamical system. We illustrate this, using the Hamilton-Jacobi equation, in various examples: particle mechanics on a fixed energy surface; non-Abelian gauge theories for compact semi-simple Lie groups where the Gauss law presents new features; and General Relativity in d+1 dimensions with d the dimension of space. The discussion in General Relativity is like the non-abelian gauge theory case except for the indefiniteness of the de Witt metric in the Einstein-Hamilton-Jacobi equation, which we discuss in some detail. We illustrate the general formula for the emergent time in various examples including de Sitter spacetime and asymptotically AdS spacetimes.

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