Lie-Poisson Hamilton-Jacobi theory and Lie-Poisson integrators

Energy and Quadratic Invariants Preserving Methods for Hamiltonian Systems With Holonomic Constraints, Two Novel Classes of Arbitrary High-Order Structure-Preserving Algorithms for Canonical Hamiltonian Systems, Structure-preserving techniques in accelerator physics, Hamilton-Jacobi theorems for regular reducible Hamiltonian systems on a cotangent bundle, Poisson Integrators Based on Splitting Method for Poisson Systems, Time integrators based on approximate discontinuous Hamiltonians, A numerical test of long-time stability for rigid body integrators, Symplectic-energy-momentum preserving variational integrators, Symmetry preserving numerical schemes for partial differential equations and their numerical tests, A space-time discontinuous Galerkin method for linearized elastodynamics with element-wise momentum balance, Conservative single-step time-integration schemes with higher-order accuracy for multi-particle dynamics with local two-point potentials, Moment invariants for the Vlasov equation, Using some results about the Lie evolution of differential operators to obtain the Fokker-Planck equation for non-Hamiltonian dynamical systems of interest, Total variation in Hamiltonian formalism and symplectic-energy integrators, The averaged Lagrangian method, On the geometry of the Hamilton-Jacobi equation and generating functions, Hamiltonian operator inference: physics-preserving learning of reduced-order models for canonical Hamiltonian systems, Advanced discretization techniques for hyperelastic physics-augmented neural networks, Invariant variational schemes for ordinary differential equations, Arbitrary high-order EQUIP methods for stochastic canonical Hamiltonian systems, Globally time-reversible fluid simulations with smoothed particle hydrodynamics, Hamilton-Jacobi equations for a regular controlled Hamiltonian system and its reduced systems, Energy-preserving methods for non-smooth nonlinear Schrödinger equations, On the preservation of second integrals by Runge-Kutta methods, A structure-preserving integrator for incompressible finite elastodynamics based on a Grad-div stabilized mixed formulation with particular emphasis on stretch-based material models, Growth and integrability of some birational maps in dimension three, Symmetric Reduction and Hamilton-Jacobi Equations of the Controlled Underwater Vehicle-Rotor System, On the design of non-singular, energy-momentum consistent integrators for nonlinear dynamics using energy splitting and perturbation techniques, Time adaptive variational integrators: a space-time geodesic approach, Symmetries and reduction Part II — Lagrangian and Hamilton–Jacobi picture, Structure-preserving integrators for dissipative systems based on reversible– irreversible splitting, Symplectic groupoids for Poisson integrators, Nonlinear convolution finite element method for solution of large deformation elastodynamics, Runge-Kutta collocation methods for rigid body lie-poisson equations, Noether’s-type theorems on time scales, Reduction theory and the Lagrange–Routh equations, A Note on the Generating Function Method, Higher-order discrete variational problems with constraints, Energy-stepping integrators in Lagrangian mechanics, An Efficient Spectral Petrov-Galerkin Method for Nonlinear Hamiltonian Systems, Structure-Preserving Numerical Methods for Stochastic Poisson Systems, Accurate and efficient simulation of rigid-body rotations., A PANORAMIC VIEW OF SOME PERTURBED NONLINEAR WAVE EQUATIONS, The minimal stage, energy preserving Runge–Kutta method for polynomial Hamiltonian systems is the averaged vector field method, An ergodic sampling scheme for constrained Hamiltonian systems with applications to molecular dynamics, A Characterization of Energy-Preserving Methods and the Construction of Parallel Integrators for Hamiltonian Systems, Poisson integrators, Unnamed Item, Lie-Poisson integrators: A Hamiltonian, variational approach, Conservation laws of semidiscrete Hamiltonian equations, Symplectic methods for the nonlinear Schrödinger equation, Discrete port-Hamiltonian systems, Force-stepping integrators in Lagrangian mechanics, Solving ODEs numerically while preserving a first integral, Symplectic properties research for finite element methods of Hamiltonian system, Integrable decomposition methods and ensemble averaging for non-integrableN-vortex problems, Discrete total variation calculus and Lee's discrete mechanics, Algorithms by Design: Part II—A Novel Normalized Time Weighted Residual Methodology and Design of a Family of Symplectic-Momentum Conserving Algorithms for Nonlinear Structural Dynamics, Algorithms by Design: Part III—A Novel Normalized Time Weighted Residual Methodology and Design of Optimal Symplectic-Momentum Based Controllable Numerical Dissipative Algorithms for Nonlinear Structural Dynamics, Symmetry-Preserving Finite Element Schemes: An Introductory Investigation, Explicit Lie-Poisson integration and the Euler equations, Bespoke finite difference schemes that preserve multiple conservation laws, A Variational Approach to Multirate Integration for Constrained Systems, Adaptive Hamiltonian Variational Integrators and Applications to Symplectic Accelerated Optimization, Reduction of Hamilton's variational principle, Symplectic integration of Hamiltonian wave equations, Hamiltonian truncation of the shallow water equation, Energy-conserving time propagation for a structure-preserving particle-in-cell Vlasov-Maxwell solver, Energy and quadratic invariants preserving (EQUIP) multi-symplectic methods for Hamiltonian wave equations, Conserving algorithms for the dynamics of Hamiltonian systems on Lie groups, Integrable discrete systems and numerical integrators, Momentum conserving symplectic integrators, The rate of error growth in Hamiltonian-conserving integrators, Symplectic methods for the Ablowitz-Ladik model, Equivariant constrained symplectic integration, Second-order variational problems on Lie groupoids and optimal control applications, A note for Lie-Poisson Hamilton-Jacobi equation and Lie-Poisson integrator, Lie-Poisson integration for rigid body dynamics, Conservative integrators for many-body problems, Existence of formal integrals of symplectic integrators, Hamiltonian algorithms for Hamiltonian systems and a comparative numerical study, Geometry of discrete-time spin systems, The limits of Hamiltonian structures in three-dimensional elasticity, shells, and rods, Unconditional stability and long-term behavior of transient algorithms for the incompressible Navier-Stokes and Euler equations, Enhancing energy conserving methods, Long-term dissipativity of time-stepping algorithms for an abstract evolution equation with applications to the incompressible MHD and Navier-Stokes equations, The Hamiltonian structure of nonlinear elasticity: The material and convective representations of solids, rods, and plates, Symmetric decomposition of exponential operators and evolution problems, Meshless conservative scheme for multivariate nonlinear Hamiltonian PDEs, New conservative schemes with discrete variational derivatives for nonlinear wave equations, A novel GEEC (geometry, energy, and entropy compatible) procedure applied to a staggered direct-ALE scheme for hydrodynamics, Energy-preserving integrators and the structure of B-series, On the conservativeness of two-stage symmetric-symplectic Runge-Kutta methods and the Störmer-Verlet method, Lie group variational integrators for the full body problem in orbital mechanics, State-dependent symplecticity and area preserving numerical methods, Computing statistics for Hamiltonian systems: A case study, A review of structure-preserving numerical methods for engineering applications, On the discretization of nonholonomic dynamics in \(\mathbb{R}^n\), Runge-Kutta method, finite element method, and regular algorithms for Hamiltonian system, Geometric generalisations of SHAKE and RATTLE, A novel formulation of point vortex dynamics on the sphere: geometrical and numerical aspects, On the development of symmetry-preserving finite element schemes for ordinary differential equations, High order accurate finite difference schemes based on symmetry preservation, An energy-preserving algorithm for nonlinear Hamiltonian wave equations with Neumann boundary conditions, Calling time on digital clocks, Energy-preserving variational integrators for forced Lagrangian systems, A general framework for conservative single-step time-integration schemes with higher-order accuracy for a central-force system., Numerical investigation of stochastic canonical Hamiltonian systems by high order stochastic partitioned Runge-Kutta methods, Formulation and simulations of the conserving algorithm for feedback stabilization on rigid body rotations, Mechanical integrators derived from a discrete variational principle, On some dissipative fully discrete nonlinear Galerkin schemes for the Kuramoto-Sivashinsky equation, Explicit energy conservative difference schemes for nonlinear dynamical systems with at most quartic potentials, An energy-preserving exponentially-fitted continuous stage Runge-Kutta method for Hamiltonian systems, Exact evolution of time-reversible symplectic integrators and their phase errors for the harmonic oscillator, Volume-preserving integrators have linear error growth, Conservative, unconditionally stable discretization methods for Hamiltonian equations, applied to wave motion in lattice equations modeling protein molecules, Construction of Runge-Kutta type methods for solving ordinary differential equations, Linearly implicit structure-preserving schemes for Hamiltonian systems, Energy preserving schemes for nonlinear Hamiltonian systems of wave equations: application to the vibrating piano string, Preserving dissipation in approximate inertial forms for the Kuramoto- Sivashinsky equation, Equivariant symplectic difference schemes and generating functions, Integrators for Lie-Poisson dynamical systems, Splitting schemes and energy preservation for separable Hamiltonian systems, A two-step, fourth-order method with energy preserving properties, Projection methods and discrete gradient methods for preserving first integrals of ODEs, Symplectic integrators for long-term integrations in celestial mechanics, Difference forms, Galerkin Lie-group variational integrators based on unit quaternion interpolation, Numerical invariant tori of symplectic integrators for integrable Hamiltonian systems, Some new discretizations of the Euler-Lagrange equation, Recent progress in the theory and application of symplectic integrators, Hamilton-Jacobi theory, symmetries and coisotropic reduction, Time finite element methods: a unified framework for numerical discretizations of ODEs, The discrete energy-momentum method. Conserving algorithms for nonlinear elastodynamics, Lie group spectral variational integrators, Exact energy-momentum conserving algorithms and symplectic schemes for nonlinear dynamics, On the conservativeness of a two-parameter family of three-stage symmetric-symplectic Runge-Kutta methods, On energy conservation and \(P\)-stability, A note on continuous-stage Runge-Kutta methods, New energy-preserving algorithms for nonlinear Hamiltonian wave equation equipped with Neumann boundary conditions, Preserving Poisson structure and orthogonality in numerical integration of differential equations, Optimal error estimate of a compact scheme for nonlinear Schrödinger equation, Energy-preserving continuous stage extended Runge-Kutta-Nyström methods for oscillatory Hamiltonian systems, A conservative discretization of the Kepler problem based on the \(L\)-transformations, Fractional damping through restricted calculus of variations, Implicit one-step dynamic algorithms with configuration-dependent parameters: application to central force fields, Variational integrators for reduced magnetohydrodynamics, Variational integrators for the dynamics of thermo-elastic solids with finite speed thermal waves, Energy preservation and entropy in Lagrangian space- and time-staggered hydrodynamic schemes, Runge-Kutta methods for quadratic ordinary differential equations, Line integral solution of differential problems, Krylov projection methods for linear Hamiltonian systems, Energy-preserving trigonometrically fitted continuous stage Runge-Kutta-Nyström methods for oscillatory Hamiltonian systems, Symplectic integration with floating-point arithmetic and other approximations, Energy corrections in Hamiltonian dynamics simulations, Clebsch canonization of Lie-Poisson systems, The Lie-Trotter integrator in the dynamics of a mechanical system, On the invariance of generating functions for symplectic transformations, Symmetry reduction of discrete Lagrangian mechanics on Lie groups, A direct approach to conformational dynamics based on hybrid Monte Carlo, Variational integrators and time-dependent Lagrangian systems, Explicit exactly energy-conserving methods for Hamiltonian systems, A Hamiltonian, explicit algorithm with spectral accuracy for the `good' Boussinesq system, Numerical integration of ordinary differential equations on manifolds, Formal energy of a symplectic scheme for Hamiltonian systems and its applications. 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• The Hamiltonian structure for dynamic free boundary problems
• Product formulas and numerical algorithms
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