Poly-symplectic groupoids and poly-Poisson structures
classification
🧮 math.SG
math-phmath.MP
keywords
structuresgroupoidspoly-poissonpoly-symplecticaspectsav-diraccontextcounterparts
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We introduce poly-symplectic groupoids, which are natural extensions of symplectic groupoids to the context of poly-symplectic geometry, and define poly-Poisson structures as their infinitesimal counterparts. We present equivalent descriptions of poly-Poisson structures, including one related with AV-Dirac structures. We also discuss symmetries and reduction in the setting of poly-symplectic groupoids and poly-Poisson structures, and use our viewpoint to revisit results and develop new aspects of the theory initiated by D.Iglesias, J.C Marrero and M. Vaquero.
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