Abstract
In this paper we study noncommutative integrable systems on b-Poisson manifolds. One important source of examples (and motivation) of such systems comes from considering noncommutative systems on manifolds with boundary having the right asymptotics on the boundary. In this paper we describe this and other examples and prove an action-angle theorem for noncommutative integrable systems on a b-symplectic manifold in a neighborhood of a Liouville torus inside the critical set of the Poisson structure associated to the b-symplectic structure.
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Atiyah, M. F., Convexity and Commuting Hamiltonians, Bull. London Math. Soc., 1982, vol. 14, no. 1, pp. 1–15.
Besse, A. L., Manifolds All of Whose Geodesics Are Closed, Ergeb. Math. Grenzgeb. (2), vol. 93, Berlin: Springer, 2012.
Bolsinov, A.V. and Jovanović, B., Non-Commutative Integrability, Moment Map and Geodesic Flows, Ann. Glob. Anal. Geom., 2003, vol. 23, no. 4, pp. 305–322.
Delshams, A., Kiesenhofer, A. and Miranda, E., Examples of Integrable and Non-Integrable Systems on Singular Symplectic Manifolds, J. Geom. Phys., 2016 (in press).
Fernandes, R. L., Laurent-Gengoux, C., and Vanhaecke, P., Global Action–Angle Variables for Non- Commutative Integrable Systems, arXiv:1503.00084 (2015).
Gualtieri, M., Li, S., Pelayo, Á., and Ratiu, T., The Tropical Momentum Map: A Classification of Toric Log Symplectic Manifolds, Math. Ann., 2016, 42 pp.
Guillemin, V., Miranda, E., and Pires, A.R., Codimension One Symplectic Foliations and Regular Poisson Structures, Bull. Braz. Math. Soc. (N. S.), 2011, vol. 42, no. 4, pp. 607–623.
Guillemin, V., Miranda, E., and Pires, A.R., Symplectic and Poisson Geometry on b-Manifolds, Adv. Math., 2014, vol. 264, pp. 864–896.
Guillemin, V., Miranda, E., Pires, A. R., and Scott, G., Toric Actions on b-Symplectic Manifolds, Int. Math. Res. Not. IMRN, 2015, no. 14, pp. 5818–5848.
Guillemin, V., Miranda, E., Pires, A. R., and Scott, G., Convexity for Hamiltonian Torus Actions on b-Symplectic Manifolds, Math. Res. Lett., 2016 (to appear).
Guillemin, V. and Sternberg, Sh., Convexity Properties of the Moment Mapping, Invent. Math., 1982, vol. 67, no. 3, pp. 491–513.
Guillemin, V. and Sternberg, Sh., Symplectic Techniques in Physics, 2nd ed., Cambridge: Cambridge Univ. Press, 1990.
Kiesenhofer, A. and Miranda, E., Cotangent Models for Integrable Systems, Commun. Math. Phys., 2016, 23 pp.
Kiesenhofer, A., Miranda, E., and Scott, G., Action–Angle Variables and a KAM Theorem for b-Poisson Manifolds, J. Math. Pures Appl. (9), 2016, vol. 105, no. 1, pp. 66–85.
Kirwan, F., Convexity Properties of the Moment Mapping: 3, Invent. Math., 1984, vol. 77, no. 3, pp. 547–552.
Laurent-Gengoux, C., Miranda, E., and Vanhaecke, P., Action–Angle Coordinates for Integrable Systems on Poisson Manifolds, Int. Math. Res. Not. IMRN, 2011, no. 8, pp. 1839–1869.
Miranda, E. and Solha, R., On a Poincaré Lemma for Foliations, in Foliations 2012, P. Walczak, J. Álvarez López, S. Hurder, R. Langevin, and T. Tsuboi (Eds.), Hackensack,N.J.: World Sci., 2013, pp. 115–137.
Martínez Torres, D. and Miranda, E., Weakly Hamiltonian Actions, J. Geom. Phys., 2016 (in press).
Lie, S., Theorie der Transformationsgruppen: Vol. 1, Leipzig: Teubner, 1888.
Nekhoroshev, N. N., Action–Angle Variables and Their Generalization, Trans. Moscow Math. Soc., 1972, vol. 26, pp. 180–198; see also: Tr. Mosk. Mat. Obs., 1972, vol. 26, pp. 181–198.
Sjamaar, R., Convexity Properties of the Moment Mapping Re-Examined, Adv. Math., 1998, vol. 138, no. 1, pp. 46–91.
Souriau, J.-M., Structure des systèmes dynamiques, Maîtrises de mathématiques, Paris: Dunod, 1970.
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Kiesenhofer, A., Miranda, E. Noncommutative integrable systems on b-symplectic manifolds. Regul. Chaot. Dyn. 21, 643–659 (2016). https://doi.org/10.1134/S1560354716060058
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DOI: https://doi.org/10.1134/S1560354716060058