Conservative numerical methods for \(\ddot x=f(x)\)

A note on the equivalence of two recent time-integration schemes for N-body problems, Conserving algorithms for the dynamics of Hamiltonian systems on Lie groups, Conservation properties of a time FE method?part III: Mechanical systems with holonomic constraints, A rotationless formulation of multibody dynamics: modeling of screw joints and incorporation of control constraints, Some energy preserving finite element schemes based on the discrete variational derivative method, Arbitrary order numerical methods conserving integrals for solving dynamic equations, Energy--work connection integration schemes for mechanico-electrical systems, Enhancing energy conserving methods, An explicit energy-conserving numerical method for equations of the form \(d^ 2x/dt^ 2=f(x)\), Explicit energy-conserving schemes for the three-body problem, Energy-momentum conserving integration of multibody dynamics, On the conservativeness of two-stage symmetric-symplectic Runge-Kutta methods and the Störmer-Verlet method, Global format for energy-momentum based time integration in nonlinear dynamics, Advanced discretization techniques for hyperelastic physics-augmented neural networks, A novel mixed and energy‐momentum consistent framework for coupled nonlinear thermo‐electro‐elastodynamics, An energy conservation algorithm for nonlinear dynamic equation, A structure-preserving integrator for incompressible finite elastodynamics based on a Grad-div stabilized mixed formulation with particular emphasis on stretch-based material models, A continuum and computational framework for viscoelastodynamics. II: Strain-driven and energy-momentum consistent schemes, On the design of non-singular, energy-momentum consistent integrators for nonlinear dynamics using energy splitting and perturbation techniques, Conservative difference formulations of Calogero and Toda Hamiltonian systems, Completely conservative, covariant numerical solution of systems of ordinary differential equations with applications, Dynamical difference equations, Finite difference schemes for \(\frac{\partial u}{\partial t}=(\frac{\partial}{\partial x})^\alpha\frac{\delta G}{\delta u}\) that inherit energy conservation or dissipation property, Explicit energy conservative difference schemes for nonlinear dynamical systems with at most quartic potentials, Energy preserving schemes for nonlinear Hamiltonian systems of wave equations: application to the vibrating piano string, Conservative spline methods for second-order IVPs of ODEs, Unnamed Item, Inherently energy conserving time finite elements for classical mechanics, The time finite element as a robust general scheme for solving nonlinear dynamic equations including chaotic systems, A mixed variational framework for the design of energy-momentum schemes inspired by the structure of polyconvex stored energy functions, A PANORAMIC VIEW OF SOME PERTURBED NONLINEAR WAVE EQUATIONS, Exact energy-momentum conserving algorithms and symplectic schemes for nonlinear dynamics, On energy conservation and \(P\)-stability, Energy conservative stochastic difference scheme for stochastic Hamilton dynamical systems, A high-order energy-conserving integration scheme for Hamiltonian systems, A note on energy conservation for Hamiltonian systems using continuous time finite elements, Numerical simulation for a nonlinear partial differential equation with variable coefficients by means of the discrete variational derivative method, Finite-difference schemes for nonlinear wave equation that inherit energy conservation property, Conservative linearly-implicit difference scheme for a class of modified Zakharov systems with high-order space fractional quantum correction, Numerically induced stochasticity, Explicit exactly energy-conserving methods for Hamiltonian systems, Invariant-conserving finite difference algorithms for the nonlinear Klein-Gordon equation, Arbitrary order, Hamiltonian conserving numerical solutions of Calogero and Toda systems

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• Energy and momentum conserving methods of arbitrary order for the numerical integration of equations of motion. I: Motion of a single particle
• Discrete numerical methods in physics and engineering
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