AKSZ construction for shifted Poisson structures
Abstract
We prove the AKSZ theorem for shifted Poisson structures: if X is an n-shifted Poisson derived stack, and Y a d-oriented derived stack, then the mapping stack \[Map(Y,X)\] is naturally endowed with an (n-d)-shifted Poisson structure. For this, we prove that the data of an n-shifted Poisson structure on a derived Artin stack is equivalent to the data of an (n+1)-shifted Lagrangian thickening of it. We also extend the definition of shifted Poisson structures to derived prestacks having a deformation theory and give two applications, one for mapping stacks with a non-proper source and one in BV formalism.
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