Quantization of (-1)-Shifted Derived Poisson Manifolds

Abstract

We investigate the quantization problem of (-1)-shifted derived Poisson manifolds in terms of ∞-operators on the space of Berezinian half-densities. We prove that quantizing such a (-1)-shifted derived Poisson manifold is equivalent to the lifting of a consecutive sequences of Maurer-Cartan elements of short exact sequences of differential graded Lie algebras, where the obstruction is a certain class in the second Poisson cohomology. Consequently, a (-1)-shifted derived Poisson manifold is quantizable if the second Poisson cohomology group vanishes. We also prove that for any -algebroid , its corresponding linear (-1)-shifted derived Poisson manifold [-1] admits a canonical quantization. Finally, given a Lie algebroid A and a one-cocycle s∈ A, the (-1)-shifted derived Poisson manifold corresponding to the derived intersection of coisotropic submanifolds determined by the graph of s and the zero section of the Lie Poisson A is shown to admit a canonical quantization in terms of Evens-Lu-Weinstein module.