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Displaying 841 – 860 of 864

Symplectic structure of the moduli space of sheaves on an abelian or K3 surface.

Shigeru Mukai (1984)

Inventiones mathematicae

Symplectic structures and cohomologies on some solvmanifolds.

Gorbatsevich, V.V. (2003)

Sibirskij Matematicheskij Zhurnal

Symplectic subvarieties of projective fibrations over symplectic manifolds

Roberto Paoletti (1999)

Annales de l'institut Fourier

Given a symplectic fibration $E \to M$ , with $M$ compact and symplectic and the fibres complex projective, we produce symplectic submanifolds of $E$ analytic in the vertical direction, and apply this to complex vector bundles on symplectic manifolds.

Symplectic Topology and Extemal Rays.

Y. Ruan (1993)

Geometric and functional analysis

Symplectic Topology and Hamiltonian Dynamics.

H. Hofer, I. Ekeland (1988/1989)

Mathematische Zeitschrift

Symplectic Topology and Hamiltonian Dynamics II.

Helmut Hofer, Ivar Ekeland (1990)

Mathematische Zeitschrift

Symplectic topology as the geometry of generating functions.

Claude Viterbo (1992)

Mathematische Annalen

Symplectic topology of integrable hamiltonian systems, I : Arnold-Liouville with singularities

Nguyen Tien Zung (1996)

Compositio Mathematica

Symplectic torus actions with coisotropic principal orbits

Johannes Jisse Duistermaat, Alvaro Pelayo (2007)

Annales de l’institut Fourier

In this paper we completely classify symplectic actions of a torus $T$ on a compact connected symplectic manifold $(M, σ)$ when some, hence every, principal orbit is a coisotropic submanifold of $(M, σ)$ . That is, we construct an explicit model, defined in terms of certain invariants, of the manifold, the torus action and the symplectic form. The invariants are invariants of the topology of the manifold, of the torus action, or of the symplectic form.In order to deal with symplectic actions which are not Hamiltonian,...

Symplectic twistor operator and its solution space on $ℝ^{2}$

Marie Dostálová, Petr Somberg (2013)

Archivum Mathematicum

We introduce the symplectic twistor operator $T_{s}$ in symplectic spin geometry of real dimension two, as a symplectic analogue of the Dolbeault operator in complex spin geometry of complex dimension 1. Based on the techniques of the metaplectic Howe duality and algebraic Weyl algebra, we compute the space of its solutions on $ℝ^{2}$ .

Symplectomorphism groups and isotropic skeletons.

Coffey, Joseph (2005)

Geometry & Topology

Sympletic Curvature Tensors.

Izu Vaisman (1985)

Monatshefte für Mathematik

Synchronizable observer fields and their restspaces.

Lupu, Daniela (2000)

APPS. Applied Sciences

Synge-Beil and Riemann-Jacobi jet structures with applications to physics.

Balan, Vladimir (2003)

International Journal of Mathematics and Mathematical Sciences

Systèmes hamiltoniens k-symplectiques.

Azzouz Awane, Mohamed Belam, Sadik Fikri, Mohammed Lahmouz, Bouchra Naanani (2002)

Revista Matemática Complutense

We study some properties of the k-symplectic Hamiltonian systems in analogy with the well-known classical Hamiltonian systems. The integrability of k-symplectic Hamiltonian systems and the relationships with the Nambu's statistical mechanics are given.

Systems of covers of frames and resulting subframes

Kříž, I., Pultr, A. (1987)

Proceedings of the 14th Winter School on Abstract Analysis

Systems of rays in the presence of distribution of hyperplanes

S. Janeczko (1995)

Banach Center Publications

Horizontal systems of rays arise in the study of integral curves of Hamiltonian systems $v_{H}$ on T*X, which are tangent to a given distribution V of hyperplanes on X. We investigate the local properties of systems of rays for general pairs (H,V) as well as for Hamiltonians H such that the corresponding Hamiltonian vector fields $v_{H}$ are horizontal with respect to V. As an example we explicitly calculate the space of horizontal geodesics and the corresponding systems of rays for the canonical distribution...

Currently displaying 841 – 860 of 864