In a previous paper, we showed how to use the techniques of the group of loops to formulate the loop approach to gravity proposed by Mandelstam in the 1960's. Those techniques allow to overcome some of the difficulties that had been encountered in the earlier treatment. In this approach, gravity is formulated entirely in terms of Dirac observables without constraints, opening attractive new possibilities for quantization. In this paper we discuss the Poisson algebra of the resulting Dirac observables, associated with the intrinsic components of the Riemann tensor. This provides an explicit realization of the non-local algebra of observables for gravity that several authors have conjectured.
Publication Source (Journal or Book title)
Classical and Quantum Gravity
Gambini, R., Rastgoo, S., & Pullin, J. (2020). Gravitation in terms of observables 2: The algebra of fundamental observables. Classical and Quantum Gravity, 37 (14) https://doi.org/10.1088/1361-6382/ab8eb8