Double BFV quantisation of 3d Gravity

Abstract

We extend the cohomological setting developed by Batalin, Fradkin and Vilkovisky (BFV), which produces a resolution of coisotropic reduction in terms of hamiltonian dg manifolds, to the case of nested coisotropic embeddings C C F inside a symplectic manifold F. To this, we naturally assign C and C, as well as the respective BFV dg manifolds. We show that the data of a nested coisotropic embedding defines a natural graded coisotropic embedding inside the BFV dg manifold assigned to C, whose reduction can further be resolved using the BFV prescription. We call this construction double BFV resolution, and we use it to prove that "resolution commutes with reduction" for a general class of nested coisotropic embeddings. We then deduce a quantisation of C, from the (graded) geometric quantisation of the double BFV Hamiltonian dg manifold (when it exists), following the quantum BFV prescription. As an application, we provide a well defined candidate space of (physical) quantum states of three-dimensional Einstein--Hilbert theory, which is thought of as a partial reduction of the Palatini--Cartan model for gravity.

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