On the Numerical Integration of Ordinary Differential Equations by Symmetric Composition Methods

Tuning Symplectic Integrators is Easy and Worthwhile ⋮ On symmetric-conjugate composition methods in the numerical integration of differential equations ⋮ Geometric Integration of ODEs Using Multiple Quadratic Auxiliary Variables ⋮ Retraction maps: a seed of geometric integrators ⋮ Composition Schemes for the Guiding-Center Model ⋮ A conservative fourth-order real space method for the (2+1)D Dirac equation ⋮ Symmetric, explicit numerical integrator for molecular dynamics equations of motion with a generalized friction ⋮ Energy spreading in strongly nonlinear disordered lattices ⋮ Symmetrically Processed Splitting Integrators for Enhanced Hamiltonian Monte Carlo Sampling ⋮ Derivation of symmetric composition constants for symmetric integrators ⋮ Accurate and efficient simulation of rigid-body rotations. ⋮ Non-existence of the modified first integral by symplectic integration methods ⋮ High order numerical integrators for differential equations using composition and processing of low order methods ⋮ Splitting methods for non-autonomous Hamiltonian equations ⋮ Geometric integrators for the nonlinear Schrödinger equation ⋮ High-order Runge-Kutta-Nyström geometric methods with processing ⋮ Explicit variable step-size and time-reversible integration ⋮ Solving ODEs numerically while preserving a first integral ⋮ Solving ODEs numerically while preserving a first integral ⋮ IMSP schemes for spatially explicit models of cyclic populations and metapopulation dynamics ⋮ Structure-Preserving Numerical Integrators for Hodgkin--Huxley-Type Systems ⋮ Geometric integrators and the Hamiltonian Monte Carlo method ⋮ Diluted axion star collisions with neutron stars ⋮ IMSP schemes for spatially explicit models of cyclic populations and metapopulation dynamics ⋮ Optimized Forest-Ruth- and Suzuki-like algorithms for integration of motion in many-body systems ⋮ Explicit volume-preserving and symplectic integrators for trigonometric polynomial flows. ⋮ Geometric numerical integration applied to the elastic pendulum at higher-order resonance. ⋮ A dissipation-preserving scheme for damped oscillatory Hamiltonian systems based on splitting ⋮ Explicit, parallel Poisson integration of point vortices on the sphere ⋮ Composite symmetric second derivative general linear methods for Hamiltonian systems ⋮ New multisymplectic self-adjoint scheme and its composition scheme for the time-domain Maxwell’s equations ⋮ Efficient symplectic Runge-Kutta methods ⋮ Poisson Integrators Based on Splitting Method for Poisson Systems ⋮ Higher order volume-preserving schemes for charged particle dynamics ⋮ Explicit adaptive symplectic integrators for solving Hamiltonian systems ⋮ Construction of exponentially fitted symplectic Runge-Kutta-Nyström methods from partitioned Runge-Kutta methods ⋮ \textsc{Bill2d} -- a software package for classical two-dimensional Hamiltonian systems ⋮ Composite integrators for bi-Hamiltonian systems ⋮ Continuum approximations for pulses generated by impulsive initial data in binary exciton chain systems ⋮ Equivariant constrained symplectic integration ⋮ Composition methods in the presence of small parameters ⋮ Lack of dissipativity is not symplecticness ⋮ Composite symmetric general linear methods (COSY-GLMs) for the long-time integration of reversible Hamiltonian systems ⋮ Further reduction in the number of independent order conditions for symplectic, explicit partitioned Runge-Kutta and Runge-Kutta-Nyström methods ⋮ Lie group integration for constrained generalized Hamiltonian system with dissipation by projection method ⋮ Arbitrarily high order convected scheme solution of the Vlasov-Poisson system ⋮ Unconventional schemes for a class of ordinary differential equations - with applications to the Korteweg-de Vries equation ⋮ Optimal stability polynomials for splitting methods, with application to the time-dependent Schrödinger equation ⋮ Explicit high-order symplectic integrators for charged particles in general electromagnetic fields ⋮ Adaptive multi-stage integrators for optimal energy conservation in molecular simulations ⋮ \(SB^{3}A\) splitting for approximation of invariants in time-dependent Hamiltonian systems ⋮ Symmetric second derivative integration methods ⋮ Goldberg's theorem and the Baker-Campbell-Hausdorff formula ⋮ Pulses in binary wave guide arrays and long wave PDE approximations ⋮ Inducing multistability in discrete chaotic systems using numerical integration with variable symmetry ⋮ High-order full discretization for anisotropic wave equations ⋮ The density-matrix renormalization group in the age of matrix product states ⋮ Preservation of stability properties near fixed points of linear Hamiltonian systems by symplectic integrators ⋮ Component splitting for semi-discrete Maxwell equations ⋮ Composition constants for raising the orders of unconventional schemes for ordinary differential equations ⋮ Phase fitted symplectic partitioned Runge-Kutta methods for the numerical integration of the Schrödinger equation ⋮ Exact evolution of time-reversible symplectic integrators and their phase errors for the harmonic oscillator ⋮ Volume-preserving integrators have linear error growth ⋮ Symplectic integration with non-canonical quadrature for guiding-center orbits in magnetic confinement devices ⋮ Multi-symplectic Runge-Kutta collocation methods for Hamiltonian wave equations ⋮ Near conserving energy numerical schemes for two-dimensional coupled seismic wave equations ⋮ Splitting schemes and energy preservation for separable Hamiltonian systems ⋮ A fully adaptive reaction-diffusion integration scheme with applications to systems biology ⋮ High-order integration scheme for relativistic charged particle motion in magnetized plasmas with volume preserving properties ⋮ On the linear stability of splitting methods ⋮ On time staggering for wave equations ⋮ Novel phase-fitted symmetric splitting methods for chemical oscillators ⋮ Practical splitting methods for the adaptive integration of nonlinear evolution equations. I: Construction of optimized schemes and pairs of schemes ⋮ New schemes for the coupled nonlinear Schrödinger equation ⋮ Unconditionally stable split-step finite difference time domain formulations for double-dispersive electromagnetic materials ⋮ High order three part split symplectic integrators: Efficient techniques for the long time simulation of the disordered discrete nonlinear Schrödinger equation ⋮ A Hamiltonian pertubation approach to construction of geometric integrators for optimal control problems ⋮ Preservation of equilibria for symplectic methods applied to Hamiltonian systems ⋮ Dedicated symplectic integrators for rotation motions ⋮ Symplectic propagators for the Kepler problem with time-dependent mass ⋮ Computation of the eigenvalues of the Schrödinger equation by symplectic and trigonometrically fitted symplectic partitioned Runge-Kutta methods ⋮ A high-order energy-conserving integration scheme for Hamiltonian systems ⋮ An almost symmetric Strang splitting scheme for nonlinear evolution equations ⋮ Splitting and composition methods for explicit time dependence in separable dynamical systems ⋮ Symplectic analytically integrable decomposition algorithms: classification, derivation, and application to molecular dynamics, quantum and celestial mechanics simulations ⋮ Raising the order of geometric numerical integrators by composition and extrapolation ⋮ Forward and non-forward symplectic integrators in solving classical dynamics problems ⋮ A comparison of fourth-order operator splitting methods for cardiac simulations ⋮ Multisymplectic schemes for strongly coupled Schrödinger system ⋮ On the necessity of negative coefficients for operator splitting schemes of order higher than two ⋮ LIE–TROTTER FORMULA AND POISSON DYNAMICS ⋮ On the construction of symmetric second order methods for ODEs ⋮ Conservative local discontinuous Galerkin methods for a generalized system of strongly coupled nonlinear Schrödinger equations. ⋮ Generating functions for dynamical systems with symmetries, integrals, and differential invariants ⋮ Projected exponential Runge-Kutta methods for preserving dissipative properties of perturbed constrained Hamiltonian systems ⋮ Symmetric general linear methods ⋮ On a deformed version of the two-disk dynamo system. ⋮ High-order time-splitting Hermite and Fourier spectral methods ⋮ An almost symmetric Strang splitting scheme for the construction of high order composition methods ⋮ Multi-revolution composition methods for highly oscillatory differential equations