Recent progress in the theory and application of symplectic integrators

Explicit eighth order methods for the numerical integration of initial-value problems with periodic or oscillating solutions ⋮ Is the formal energy of the mid-point rule convergent? ⋮ On quadratic invariants and symplectic structure ⋮ Liouville operator approach to symplecticity-preserving renormalization group method ⋮ The rate of error growth in Hamiltonian-conserving integrators ⋮ Variable steps for reversible integration methods ⋮ Equivariant constrained symplectic integration ⋮ Modified equations for weakly convergent stochastic symplectic schemes via their generating functions ⋮ The anatomy of Boris type solvers and the Lie operator formalism for deriving large time-step magnetic field integrators ⋮ Existence of formal integrals of symplectic integrators ⋮ On the numerical transformation of variables in perturbation theory ⋮ Numerical experiments on the efficiency of second-order mixed-variable symplectic integrators for \(N\)-body problems ⋮ Mapping and dynamical systems ⋮ Finite difference numerical method for the superlattice Boltzmann transport equation and case comparison of CPU(C) and GPU(CUDA) implementations ⋮ Global applicability of the symplectic integrator method of Hamiltonian systems ⋮ Symmetric decomposition of exponential operators and evolution problems ⋮ On the qualitative behaviour of symplectic integrators. II: Integrable systems ⋮ On the qualitative behaviour of symplectic integrators. III: Perturbed integrable systems ⋮ A survey on symplectic and multi-symplectic algorithms ⋮ A review of structure-preserving numerical methods for engineering applications ⋮ Semi-Lagrangian discontinuous Galerkin schemes for some first- and second-order partial differential equations ⋮ The flow method for the Baker-Campbell-Hausdorff formula: exact results ⋮ A split step approach for the 3-D Maxwell's equations ⋮ COUPLE MICROSCALE PERIODIC PATCHES TO SIMULATE MACROSCALE EMERGENT DYNAMICS ⋮ A symplectic mapping for the synchronous spin-orbit problem ⋮ Explicit energy conservative difference schemes for nonlinear dynamical systems with at most quartic potentials ⋮ On the discretization of the three-dimensional Volterra system ⋮ The Serret-Andoyer formalism in rigid-body dynamics. I. Symmetries and perturbations ⋮ Exact evolution of time-reversible symplectic integrators and their phase errors for the harmonic oscillator ⋮ Symplectic integrators from composite operator factorizations ⋮ Explicit symplectic integrator for highly eccentric orbits ⋮ A new conservative numerical integration algorithm for the three-dimensional Kepler motion based on the Kustaanheimo-Stiefel regularization theory ⋮ Accelerating N-Body Simulation of Self-Gravitating Systems with Limited First-Order Post-Newtonian Approximation ⋮ On the Fer expansion: applications in solid-state nuclear magnetic resonance and physics ⋮ A Conservative Semi-Lagrangian Hybrid Hermite WENO Scheme for Linear Transport Equations and the Nonlinear Vlasov--Poisson System ⋮ Adaptive Order WENO Reconstructions for the Semi-Lagrangian Finite Difference Scheme for Advection Problem ⋮ High order three part split symplectic integrators: Efficient techniques for the long time simulation of the disordered discrete nonlinear Schrödinger equation ⋮ On Hamiltonian Particle Dynamics ⋮ Symplectic Semi-Lagrangian Schemes for Computational Fluid Dynamics ⋮ A numerical scheme for the integration of the Vlasov-Maxwell system of equations ⋮ Multi-product splitting and Runge-Kutta-Nyström integrators ⋮ Non-existence of the modified first integral by symplectic integration methods ⋮ Generalized energy integrals and energy conserving numerical schemes for partial differential equations ⋮ A positivity-preserving high-order semi-Lagrangian discontinuous Galerkin scheme for the Vlasov-Poisson equations ⋮ A hybrid finite integration-finite volume scheme ⋮ A fundamental theorem on the structure of symplectic integrators ⋮ Forward and non-forward symplectic integrators in solving classical dynamics problems ⋮ A conservative discretization of the Kepler problem based on the \(L\)-transformations ⋮ Runge-Kutta methods: Some historical notes ⋮ Mapping models for near-conservative systems with applications ⋮ Structure-Preserving Numerical Integrators for Hodgkin--Huxley-Type Systems ⋮ Non-integrability and continuation of fixed points on \(2n\)-dimensional perturbed twist maps ⋮ Computational efficiency of numerical integration methods for the tangent dynamics of many-body Hamiltonian systems in one and two spatial dimensions ⋮ Understanding <scp>Saul'yev</scp>‐type unconditionally stable schemes from exponential splitting ⋮ Relativistic motion in a constant electromagnetic field ⋮ Energy corrections in Hamiltonian dynamics simulations ⋮ SYMPLECTIC NUMERICAL METHODS IN DYNAMICS OF NONLINEAR WAVES ⋮ On an integrable discretization of the Rayleigh quotient gradient system and the power method with a shift ⋮ A new discretization of the Kepler motion which conserves the Runge-Lenz vector ⋮ Modern light on ancient feud: Robert Hooke and Newton's graphical method ⋮ A super-integrable discretization of the Calogero model ⋮ HIGHER-ORDER GEOMETRIC INTEGRATORS FOR A CLASS OF HAMILTONIAN SYSTEMS ⋮ Forward symplectic integrators for solving gravitational few-body problems

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• Fourth-order symplectic integration
• Numerically induced stochasticity
• Long-time behaviour of numerically computed orbits: Small and intermediate timestep analysis of one-dimensional systems
• Symplectic integrators and their application to dynamical astronomy
• A symplectic integration algorithm for separable Hamiltonian functions
• Runge-Kutta schemes for Hamiltonian systems
• Hamiltonian-conserving discrete canonical equations based on variational difference quotients
• Discrete Lagrange's equations and canonical equations based on the principle of least action
• Canonical Runge-Kutta methods
• Symplectic integrators for long-term integrations in celestial mechanics
• Family of symplectic implicit Runge-Kutta formulae
• Lie-Poisson Hamilton-Jacobi theory and Lie-Poisson integrators
• The Development of Variable-Step Symplectic Integrators, with Application to the Two-Body Problem
• Long-time symplectic integration: the example of four-vortex motion
• Symplectic integration of Hamiltonian systems
• Order Conditions for Canonical Runge–Kutta Schemes
• General theory of fractal path integrals with applications to many-body theories and statistical physics
• The accuracy of symplectic integrators
• An Explicit Runge–Kutta–Nyström Method is Canonical If and Only If Its Adjoint is Explicit
• Explicit Canonical Methods for Hamiltonian Systems
• Lie series and invariant functions for analytic symplectic maps
• Partitioned Runge-Kutta Methods for Separable Hamiltonian Problems
• Explicit recursive algorithms for the construction of equivalent canonical transformations
• Conservation of integrals and symplectic structure in the integration of differential equations by multistep methods