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dc.contributor.authorSchedler, Travis
dc.contributor.authorEtingof, Pavel I
dc.date.accessioned2018-03-14T20:05:37Z
dc.date.available2018-03-14T20:05:37Z
dc.date.issued2017-12
dc.date.submitted2017-10
dc.identifier.issn0377-9017
dc.identifier.issn1573-0530
dc.identifier.urihttp://hdl.handle.net/1721.1/114161
dc.description.abstractWe survey the theory of Poisson traces (or zeroth Poisson homology) developed by the authors in a series of recent papers. The goal is to understand this subtle invariant of (singular) Poisson varieties, conditions for it to be finite-dimensional, its relationship to the geometry and topology of symplectic resolutions, and its applications to quantizations. The main technique is the study of a canonical D-module on the variety. In the case the variety has finitely many symplectic leaves (such as for symplectic singularities and Hamiltonian reductions of symplectic vector spaces by reductive groups), the D-module is holonomic, and hence, the space of Poisson traces is finite-dimensional. As an application, there are finitely many irreducible finite-dimensional representations of every quantization of the variety. Conjecturally, the D-module is the pushforward of the canonical D-module under every symplectic resolution of singularities, which implies that the space of Poisson traces is dual to the top cohomology of the resolution. We explain many examples where the conjecture is proved, such as symmetric powers of du Val singularities and symplectic surfaces and Slodowy slices in the nilpotent cone of a semisimple Lie algebra. We compute the D-module in the case of surfaces with isolated singularities and show it is not always semisimple. We also explain generalizations to arbitrary Lie algebras of vector fields, connections to the Bernstein–Sato polynomial, relations to two-variable special polynomials such as Kostka polynomials and Tutte polynomials, and a conjectural relationship with deformations of symplectic resolutions. In the appendix we give a brief recollection of the theory of D-modules on singular varieties that we require. Keywords: Hamiltonian flow, Complete intersections, Milnor number, D-modules, Poisson homology, Poisson varieties, Poisson homology, Poisson traces, Milnor fibration, Calabi–Yau varieties, Deformation quantization, Kostka polynomials, Symplectic resolutions, Twistor deformationsen_US
dc.description.sponsorshipNational Science Foundation (U.S.) (Grant DMS-1502244)en_US
dc.publisherSpringer Netherlandsen_US
dc.relation.isversionofhttp://dx.doi.org/10.1007/s11005-017-1024-1en_US
dc.rightsCreative Commons Attributionen_US
dc.rights.urihttp://creativecommons.org/licenses/by/4.0/en_US
dc.sourceSpringer Netherlandsen_US
dc.titlePoisson traces, D-modules, and symplectic resolutionsen_US
dc.typeArticleen_US
dc.identifier.citationEtingof, Pavel, and Travis Schedler. “Poisson Traces, D-Modules, and Symplectic Resolutions.” Letters in Mathematical Physics, vol. 108, no. 3, Mar. 2018, pp. 633–78.en_US
dc.contributor.departmentMassachusetts Institute of Technology. Department of Mathematicsen_US
dc.contributor.mitauthorEtingof, Pavel I
dc.relation.journalLetters in Mathematical Physicsen_US
dc.eprint.versionFinal published versionen_US
dc.type.urihttp://purl.org/eprint/type/JournalArticleen_US
eprint.statushttp://purl.org/eprint/status/PeerRevieweden_US
dc.date.updated2018-02-20T05:31:50Z
dc.language.rfc3066en
dc.rights.holderThe Author(s)
dspace.orderedauthorsEtingof, Pavel; Schedler, Travisen_US
dspace.embargo.termsNen_US
dc.identifier.orcidhttps://orcid.org/0000-0002-0710-1416
mit.licensePUBLISHER_CCen_US


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