Fourth-order symplectic integration

Optimized Forest-Ruth- and Suzuki-like algorithms for integration of motion in many-body systems ⋮ An arbitrary-order cell method with block-diagonal mass-matrices for the time-dependent 2D Maxwell equations ⋮ Hamiltonian truncation of the shallow water equation ⋮ Symplectic neural networks in Taylor series form for Hamiltonian systems ⋮ A fourth-order compact time-splitting method for the Dirac equation with time-dependent potentials ⋮ Convergence of general decompositions of exponential operators ⋮ Order conditions of two kinds of canonical difference schemes ⋮ High order explicit Lorentz invariant volume-preserving algorithms for relativistic dynamics of charged particles ⋮ Additive splitting methods for parallel solutions of evolution problems ⋮ Study of correction terms for higher-order decompositions of exponential operators ⋮ Optimal four-stage symplectic integrators for molecular dynamics problems ⋮ Canonical Runge-Kutta-Nyström methods of orders five and six ⋮ Higher-order symplectic integration techniques for molecular dynamics problems ⋮ Clean numerical simulation: a new strategy to obtain reliable solutions of chaotic dynamic systems ⋮ High-order dimensionally split Lagrange-remap schemes for compressible hydrodynamics ⋮ Exponentially fitted symmetric and symplectic DIRK methods for oscillatory Hamiltonian systems ⋮ Composite integrators for bi-Hamiltonian systems ⋮ Lack of dissipativity is not symplecticness ⋮ Classification of explicit three-stage symplectic difference schemes for the numerical solution of natural Hamiltonian systems: a comparative study of the accuracy of high-order schemes on molecular dynamics problems ⋮ Energy distribution in intrinsically coupled systems: the spring pendulum paradigm ⋮ A mapping for nonconservative systems ⋮ Energy-conserving discontinuous Galerkin methods for the Vlasov-Ampère system ⋮ Symplectic integration of magnetic systems ⋮ 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 ⋮ A Fortran 90 separable Hamiltonian system solver ⋮ On the geometry of the Hamilton-Jacobi equation and generating functions ⋮ Explicit high-order symplectic integrators for charged particles in general electromagnetic fields ⋮ A WENO-based method of lines transpose approach for Vlasov simulations ⋮ Invariant norm quantifying nonlinear content of Hamiltonian systems ⋮ Goldberg's theorem and the Baker-Campbell-Hausdorff formula ⋮ A generalized Eulerian-Lagrangian discontinuous Galerkin method for transport problems ⋮ A review of structure-preserving numerical methods for engineering applications ⋮ Method of molecular dynamics in mechanics of deformable solids ⋮ Semi-Lagrangian discontinuous Galerkin schemes for some first- and second-order partial differential equations ⋮ Palindromic 3-stage splitting integrators, a roadmap ⋮ The construction of arbitrary order ERKN methods based on group theory for solving oscillatory Hamiltonian systems with applications ⋮ Fourth-order factorization of the evolution operator for time-dependent potentials ⋮ A split step approach for the 3-D Maxwell's equations ⋮ Discrete gradient algorithms of high order for one-dimensional systems ⋮ Explicit high-order gauge-independent symplectic algorithms for relativistic charged particle dynamics ⋮ An efficient high-order time integration method for spectral-element discontinuous Galerkin simulations in electromagnetics ⋮ Exact evolution of time-reversible symplectic integrators and their phase errors for the harmonic oscillator ⋮ Partitioned Runge-Kutta methods as phase volume preserving integrators ⋮ Symplectic integrators from composite operator factorizations ⋮ Integrators for Lie-Poisson dynamical systems ⋮ Invariantization of numerical schemes using moving frames ⋮ Two new solutions to the third-order symplectic integration method ⋮ Construction of higher order symplectic schemes by composition ⋮ Sixth-order Lie group integrators ⋮ Symplectic integrators for long-term integrations in celestial mechanics ⋮ An accurate and efficient numerical method for solving linear peridynamic models ⋮ New second-order exponentially and trigonometrically fitted symplectic integrators for the numerical solution of the time-independent Schrödinger equation ⋮ On the Fer expansion: applications in solid-state nuclear magnetic resonance and physics ⋮ Runge-Kutta type methods with special properties for the numerical integration of ordinary differential equations ⋮ Improved Trotter-like formula ⋮ A rapidly converging method for solving the Euler equation ⋮ Recent progress in the theory and application of symplectic integrators ⋮ Symplectic Runge-Kutta and related methods: Recent results ⋮ A symplectic FDTD algorithm for the simulations of lossy dispersive 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 ⋮ Multi-product splitting and Runge-Kutta-Nyström integrators ⋮ Numerical modeling of transient two-dimensional viscoelastic waves ⋮ A positivity-preserving high-order semi-Lagrangian discontinuous Galerkin scheme for the Vlasov-Poisson equations ⋮ Computation of the eigenvalues of the Schrödinger equation by symplectic and trigonometrically fitted symplectic partitioned Runge-Kutta methods ⋮ Almost symplectic Runge-Kutta schemes for Hamiltonian systems ⋮ Local spectral time splitting method for first- and second-order partial differential equations ⋮ A new family of regularized kernels for the harmonic oscillator ⋮ A fundamental theorem on the structure of symplectic integrators ⋮ Symplectic and trigonometrically fitted symplectic methods of second and third order ⋮ Symplectic analytically integrable decomposition algorithms: classification, derivation, and application to molecular dynamics, quantum and celestial mechanics simulations ⋮ Symplectic integrators for classical spin systems ⋮ Families of third and fourth algebraic order trigonometrically fitted symplectic methods for the numerical integration of Hamiltonian systems ⋮ A comparison of fourth-order operator splitting methods for cardiac simulations ⋮ A symplectic integrator with arbitrary vector and scalar potentials ⋮ On the necessity of negative coefficients for operator splitting schemes of order higher than two ⋮ Projected exponential Runge-Kutta methods for preserving dissipative properties of perturbed constrained Hamiltonian systems ⋮ Energy-conserving discontinuous Galerkin methods for the Vlasov-Maxwell system ⋮ Splitting K-symplectic methods for non-canonical separable Hamiltonian problems ⋮ Hamiltonian theory of guiding-center motion ⋮ A family of trigonometrically fitted partitioned Runge-Kutta symplectic methods ⋮ Computational efficiency of numerical integration methods for the tangent dynamics of many-body Hamiltonian systems in one and two spatial dimensions ⋮ Symplectic integrators and their application to dynamical astronomy ⋮ Convergence of a three-dimensional quantum lattice Boltzmann scheme towards solutions of the Dirac equation ⋮ A fourth-order compact time-splitting Fourier pseudospectral method for the Dirac equation ⋮ Optimized Lie-Trotter-Suzuki decompositions for two and three non-commuting terms ⋮ A staggered time integrator for the linear acoustic wave equation using the Jacobi-Anger expansion ⋮ An Eulerian-Lagrangian Runge-Kutta finite volume (EL-RK-FV) method for solving convection and convection-diffusion equations ⋮ From symplectic integrator to Poincaré map: Spline expansion of a map generator in Cartesian coordinates ⋮ Performance of two methods for solving separable Hamiltonian systems ⋮ An object-oriented parallel particle-in-cell code for beam dynamics simulation in linear accelerators. ⋮ Numerical methods, energy conservation, and a new method for particle motion in magnetic fields ⋮ Stiff convergence of force-gradient operator splitting methods ⋮ A general method of finding new symplectic schemes for Hamiltonian mechanics ⋮ HIGHER-ORDER GEOMETRIC INTEGRATORS FOR A CLASS OF HAMILTONIAN SYSTEMS ⋮ Quantum Monte Carlo methods and general decomposition theory of exponential operators and symplectic integrators ⋮ Forward symplectic integrators for solving gravitational few-body problems ⋮ Chaotic behaviour of solutions to a perturbed Korteweg-de Vries equation ⋮ Practical symplectic partitioned Runge-Kutta and Runge-Kutta-Nyström methods

• Computation of nonlinear behavior of Hamiltonian systems using Lie algebraic methods