Deformation quantisation for $(-2)$-shifted symplectic structures
Algebraic Geometry
2020-12-04 v2 Quantum Algebra
Abstract
We formulate a notion of quantisation of -shifted Poisson structures on derived algebraic stacks, depending on a flat right connection on the structure sheaf, as solutions of a quantum master equation. We then parametrise quantisations of -shifted symplectic structures by constructing a map to power series in de Rham cohomology. For derived schemes, we show that these quantisations give rise to classes in Borel--Moore homology, and for a large class of examples we show that the classes are closely related to Borisov--Joyce invariants.
Cite
@article{arxiv.1809.11028,
title = {Deformation quantisation for $(-2)$-shifted symplectic structures},
author = {J. P. Pridham},
journal= {arXiv preprint arXiv:1809.11028},
year = {2020}
}
Comments
40pp; v2 new material on fundamental classes