Gravitational constraint combinations generate a Lie algebra

Abstract

We find a first-order partial differential equation whose solutions are all ultralocal scalar combinations of gravitational constraints with Abelian Poisson brackets between themselves. This is a generalization of the Kuchar idea of finding alternative constraints for canonical gravity. The new scalars may be used in place of the Hamiltonian constraint of general relativity and, together with the usual momentum constraints, replace the Dirac algebra for pure gravity with a true Lie algebra: the semidirect product of the Abelian algebra of the new constraint combinations with the algebra of spatial diffeomorphisms.