kw.\*:("symplectic structure")
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Does variable step size ruin a symplectic integrator ?SKEEL, R. D; GEAR, C. W.Physica. D. 1992, Vol 60, Num 1-4, pp 311-313, issn 0167-2789Conference Paper
Coherent states and classical limitsMEINRENKEN, E.Journal of physics. A, mathematical and general. 1994, Vol 27, Num 9, pp 3257-3265, issn 0305-4470Article
A symplectic structure preserved by the trapezoidal ruleTAM, H. W; WANG, Dao Liu.Journal of the Physical Society of Japan. 2003, Vol 72, Num 9, pp 2193-2197, issn 0031-9015, 5 p.Article
On Poisson brackets and symplectic structures for the classical and quantum ZitterbewegungBARUT, A. O; ÜNAL, N.Foundations of physics. 1993, Vol 23, Num 11, pp 1423-1429, issn 0015-9018Article
Duality between the generalized caustic and Maxwell stratum for the singularities B2k and C2kNAPOLITANO, F.Comptes rendus de l'Académie des sciences. Série 1, Mathématique. 1997, Vol 325, Num 3, pp 313-317, issn 0764-4442Article
Symplectic structures associated to Lie-Poisson groupsALEKSEEV, A. YU; MALKIN, A. Z.Communications in mathematical physics. 1994, Vol 162, Num 1, pp 147-173, issn 0010-3616Article
K-symplectic structuresAWANE, A.Journal of mathematical physics. 1992, Vol 33, Num 12, pp 4046-4052, issn 0022-2488Article
Structure symplectique généralisée sur le fibré des connexions = Generalized symplectic structure on the bundle of connectionsCASTRILLON LOPEZ, M; MUNOZ MASQUE, J.Comptes rendus de l'Académie des sciences. Série 1, Mathématique. 1999, Vol 328, Num 1, pp 41-44, issn 0764-4442Article
A Modification of the Guiding-Centre Fundamental 1-Form with Strong E x B FlowMIYATO, Naoaki; SCOTT, Bruce D; STRINTZI, Dafni et al.Journal of the Physical Society of Japan. 2009, Vol 78, Num 10, issn 0031-9015, 104501.1-104501.13Article
Sur la géométrie des orbites de la représentation coadjointe du groupe de Bott - Virasoro = On the geometry of orbits of the coadjoint representation of the Bott - Virasoro groupGuieu, Laurent; Donato, Paul.1994, 192 p.Thesis
Symplectic methods for the nonlinear Schrödinger equationHERBST, B. M; VARADI, F; ABLOWITZ, M. J et al.Mathematics and computers in simulation. 1994, Vol 37, Num 4-5, pp 353-369, issn 0378-4754Conference Paper
Inequivalent quantizations of bi-Hamiltonian systemsSCHERER, W; ZAKRZEWSKI, S.Journal of physics. A, mathematical and general. 1993, Vol 26, Num 3, pp L113-L117, issn 0305-4470Article
Symplectic fusion rings and their metricGEPNER, D; SCHWIMMER, A.Nuclear physics. B. 1992, Vol 380, Num 1-2, pp 147-167, issn 0550-3213Article
Quantum kinematic approach to the geometric phase. I: General formalismMUKUNDA, N; SIMON, R.Annals of physics (Print). 1993, Vol 228, Num 2, pp 205-268, issn 0003-4916Article
Monotonicity of quadratic forms with symplectic Runge-Kutta methodsEIROLA, T.Applied numerical mathematics. 1995, Vol 17, Num 3, pp 293-298, issn 0168-9274Conference Paper
Quadratic brackets from symplectic formsALEKSEEV, A. YU; TODOROV, I. T.Nuclear physics. B. 1994, Vol 421, Num 2, pp 413-428, issn 0550-3213Article
Invariants and numerical methods for ODEsGEAR, C. W.Physica. D. 1992, Vol 60, Num 1-4, pp 303-310, issn 0167-2789Conference Paper
Volterra's realization of the KM-systemAGROTIS, M. A; DAMIANOU, P. A.Journal of mathematical analysis and applications. 2007, Vol 325, Num 1, pp 157-165, issn 0022-247X, 9 p.Article
Structures symplectiques et orbites de la représentation co-adjointe du groupe affine = Symplectic structures and orbits of coadjoint representation on the affine groupOuadfel, Ali; Sureau, Y.1995, 73 p.Thesis
On multi-symplectic partitioned Runge-Kutta methods for Hamiltonian wave equationsQINGHONG LI; YONGZHONG SONG; YUSHUN WANG et al.Applied mathematics and computation. 2006, Vol 177, Num 1, pp 36-43, issn 0096-3003, 8 p.Article
Symplectic integration of constrained Hamiltonian systems by composition methodsREICH, S.SIAM journal on numerical analysis. 1996, Vol 33, Num 2, pp 475-491, issn 0036-1429Article
An algebraic approach to discrete mechanicsBAEZ, J. C; GILLIAM, J. W.letters in mathematical physics. 1994, Vol 31, Num 3, pp 205-212, issn 0377-9017Article
Non-abelian Toda theory: a completely integrable model for strings on a black hole backgroundBILAL, A.Nuclear physics. B. 1994, Vol 422, Num 1-2, pp 258-288, issn 0550-3213Article
Canonical transformations generated by shifts in nonlinear latticesLEZNOV, A. N; SHABAT, A. B; YAMILOV, R. I et al.Physics letters. A. 1993, Vol 174, Num 5-6, pp 397-402, issn 0375-9601Article
Fractal dimension and convergence property of recursively generated symplectic integratorsITOH, T; DONGSHENG CAI.Physics letters. A. 1992, Vol 171, Num 3-4, pp 189-198, issn 0375-9601Article