Newton--Cotes formulae for long-time integration.

A new six-step algorithm with improved properties for the numerical solution of second order initial and/or boundary value problems ⋮ A new three-stages six-step finite difference pair with optimal phase properties for second order initial and/or boundary value problems with periodical and/or oscillating solutions ⋮ A five-stages symmetric method with improved phase properties ⋮ Dual Neural Network Method for Solving Multiple Definite Integrals ⋮ New three-stages symmetric six-step finite difference method with vanished phase-lag and its derivatives up to sixth derivative for second order initial and/or boundary value problems with periodical and/or oscillating solutions ⋮ New hybrid two-step method with optimized phase and stability characteristics ⋮ New Runge-Kutta type symmetric two-step method with optimized characteristics ⋮ A new fourteenth algebraic order finite difference method for the approximate solution of the Schrödinger equation ⋮ An economical eighth-order method for the approximation of the solution of the Schrödinger equation ⋮ An implicit symmetric linear six-step methods with vanished phase-lag and its first, second, third and fourth derivatives for the numerical solution of the radial Schrödinger equation and related problems ⋮ A new two stage symmetric two-step method with vanished phase-lag and its first, second, third and fourth derivatives for the numerical solution of the radial Schrödinger equation ⋮ Family of symmetric linear six-step methods with vanished phase-lag and its derivatives and their application to the radial Schrödinger equation and related problems ⋮ A family of embedded explicit six-step methods with vanished phase-lag and its derivatives for the numerical integration of the Schrödinger equation: development and theoretical analysis ⋮ A new four stages symmetric two-step method with vanished phase-lag and its first derivative for the numerical integration of the Schrödinger equation ⋮ A family of two-stage two-step methods for the numerical integration of the Schrödinger equation and related IVPs with oscillating solution ⋮ Two optimized symmetric eight-step implicit methods for initial-value problems with oscillating solutions ⋮ A new methodology for the development of numerical methods for the numerical solution of the Schrödinger equation ⋮ A new methodology for the construction of numerical methods for the approximate solution of the Schrödinger equation ⋮ High order multistep methods with improved phase-lag characteristics for the integration of the Schrödinger equation ⋮ New five-stages finite difference pair with optimized phase properties ⋮ A new two-step hybrid method for the numerical solution of the Schrödinger equation ⋮ New five-stages two-step method with improved characteristics ⋮ A new high algebraic order four stages symmetric two-step method with vanished phase-lag and its first and second derivatives for the numerical solution of the Schrödinger equation and related problems ⋮ A family of two stages tenth algebraic order symmetric six-step methods with vanished phase-lag and its first derivatives for the numerical solution of the radial Schrödinger equation and related problems ⋮ A new eight algebraic order embedded explicit six-step method with vanished phase-lag and its first, second, third and fourth derivatives for the numerical solution of the Schrödinger equation ⋮ Three stages symmetric six-step method with eliminated phase-lag and its derivatives for the solution of the Schrödinger equation ⋮ A new optimized symmetric 8-step semi-embedded predictor-corrector method for the numerical solution of the radial Schrödinger equation and related orbital problems ⋮ An efficient six-step method for the solution of the Schrödinger equation ⋮ An efficient and computational effective method for second order problems ⋮ Stability and convergence of an effective finite element method for multiterm fractional partial differential equations ⋮ Mulitstep methods with vanished phase-lag and its first and second derivatives for the numerical integration of the Schrödinger equation ⋮ New phase fitted and amplification fitted Numerov-type methods for periodic IVPs with two frequencies ⋮ A new high order two-step method with vanished phase-lag and its derivatives for the numerical integration of the Schrödinger equation ⋮ New multiple stages two-step complete in phase algorithm with improved characteristics for second order initial/boundary value problems ⋮ New multiple stages multistep method with best possible phase properties for second order initial/boundary value problems ⋮ New four stages multistep in phase algorithm with best possible properties for second order problems ⋮ New multistage two-step complete in phase scheme with improved properties for quantum chemistry problems ⋮ A new multistage multistep full in phase algorithm with optimized characteristics for problems in chemistry ⋮ A new four-stages two-step phase fitted scheme for problems in quantum chemistry ⋮ A new family of two stage symmetric two-step methods with vanished phase-lag and its derivatives for the numerical integration of the Schrödinger equation ⋮ High order four-step hybrid method with vanished phase-lag and its derivatives for the approximate solution of the Schrödinger equation ⋮ New high order multiderivative explicit four-step methods with vanished phase-lag and its derivatives for the approximate solution of the Schrödinger equation. I: construction and theoretical analysis ⋮ New optimized explicit modified RKN methods for the numerical solution of the Schrödinger equation ⋮ A new optimized Runge-Kutta pair for the numerical solution of the radial Schrödinger equation ⋮ An efficient and economical high order method for the numerical approximation of the Schrödinger equation ⋮ A generator of families of two-step numerical methods with free parameters and minimal phase-lag ⋮ New open modified trigonometrically-fitted Newton-Cotes type multilayer symplectic integrators for the numerical solution of the Schrödinger equation ⋮ A multistep method with optimal properties for second order differential equations ⋮ A four stages numerical pair with optimal phase and stability properties ⋮ A finite difference pair with improved phase and stability properties ⋮ New two stages high order symmetric six-step method with vanished phase-lag and its first, second and third derivatives for the numerical solution of the Schrödinger equation ⋮ New stable closed Newton-Cotes trigonometrically fitted formulae for long-time integration ⋮ Symplectic partitioned Runge-Kutta methods with the phase-lag property ⋮ A hybrid finite difference pair with maximum phase and stability properties ⋮ New finite difference pair with optimized phase and stability properties ⋮ Optimizing a hybrid two-step method for the numerical solution of the Schrödinger equation and related problems with respect to phase-lag ⋮ Phase fitted symplectic partitioned Runge-Kutta methods for the numerical integration of the Schrödinger equation ⋮ A new hybrid two-step method with vanished phase-lag and its first and second derivatives for the numerical solution of the Schrödinger equation and related problems ⋮ A hybrid method with phase-lag and derivatives equal to zero for the numerical integration of the Schrödinger equation ⋮ New four-stages symmetric six-step method with improved phase properties for second order problems with periodical and/or oscillating solutions ⋮ New Runge-Kutta type symmetric two step finite difference pair with improved properties for second order initial and/or boundary value problems ⋮ A new multistep method with optimized characteristics for initial and/or boundary value problems ⋮ New multiple stages scheme with improved properties for second order problems ⋮ Two-step high order hybrid explicit method for the numerical solution of the Schrödinger equation ⋮ A new four-step hybrid type method with vanished phase-lag and its first derivatives for each level for the approximate integration of the Schrödinger equation ⋮ An explicit four-step method with vanished phase-lag and its first and second derivatives ⋮ A Runge-Kutta type four-step method with vanished phase-lag and its first and second derivatives for each level for the numerical integration of the Schrödinger equation ⋮ A new explicit hybrid four-step method with vanished phase-lag and its derivatives ⋮ An explicit linear six-step method with vanished phase-lag and its first derivative ⋮ A family of explicit linear six-step methods with vanished phase-lag and its first derivative ⋮ Derivative-based trapezoid rule for the Riemann-Stieltjes integral ⋮ A family of ten-step methods with vanished phase-lag and its first derivative for the numerical solution of the Schrödinger equation ⋮ A two-step method with vanished phase-lag and its first two derivatives for the numerical solution of the Schrödinger equation ⋮ New three-stages symmetric two step method with improved properties for second order initial/boundary value problems ⋮ New hybrid symmetric two step scheme with optimized characteristics for second order problems ⋮ A hybrid type four-step method with vanished phase-lag and its first, second and third derivatives for each level for the numerical integration of the Schrödinger equation ⋮ A high algebraic order predictor-corrector explicit method with vanished phase-lag and its first, second, third and fourth derivatives for the numerical solution of the Schrödinger equation and related problems ⋮ Efficient low computational cost hybrid explicit four-step method with vanished phase-lag and its first, second, third and fourth derivatives for the numerical integration of the Schrödinger equation ⋮ A high algebraic order multistage explicit four-step method with vanished phase-lag and its first, second, third, fourth and fifth derivatives for the numerical solution of the Schrödinger equation ⋮ A low computational cost eight algebraic order hybrid method with vanished phase-lag and its first, second, third and fourth derivatives for the approximate solution of the Schrödinger equation ⋮ Exponentially fitted TDRK pairs for the Schrödinger equation ⋮ A new multistep finite difference pair for the Schrödinger equation and related problems ⋮ A new two-step finite difference pair with optimal properties ⋮ A new two stages tenth algebraic order symmetric six-step method with vanished phase-lag and its first and second derivatives for the solution of the radial Schrödinger equation and related problems ⋮ Two stages six-step method with eliminated phase-lag and its first, second, third and fourth derivatives for the approximation of the Schrödinger equation ⋮ High order computationally economical six-step method with vanished phase-lag and its derivatives for the numerical solution of the Schrödinger equation ⋮ A three-stages multistep teeming in phase algorithm for computational problems in chemistry ⋮ A four-stages multistep fraught in phase method for quantum chemistry problems ⋮ Multi-symplectic wavelet collocation method for the nonlinear Schrödinger equation and the Camassa-Holm equation ⋮ A new explicit four-step method with vanished phase-lag and its first and second derivatives ⋮ A family of eight-step methods with vanished phase-lag and its derivatives for the numerical integration of the Schrödinger equation ⋮ High order closed Newton-Cotes exponentially and trigonometrically fitted formulae as multilayer symplectic integrators and their application to the radial Schrödinger equation ⋮ Parametric optimization of digitally controlled nonlinear reactor dynamics using Zubov-like functional equations ⋮ A new four-step Runge-Kutta type method with vanished phase-lag and its first, second and third derivatives for the numerical solution of the Schrödinger equation ⋮ A family of trigonometrically fitted partitioned Runge-Kutta symplectic methods ⋮ High order closed Newton-Cotes trigonometrically-fitted formulae for the numerical solution of the Schrödinger equation ⋮ A new Numerov-type method for the numerical solution of the Schrödinger equation ⋮ A family of Runge-Kutta methods with zero phase-lag and derivatives for the numerical solution of the Schrödinger equation and related problems ⋮ High order phase fitted multistep integrators for the Schrödinger equation with improved frequency tolerance ⋮ A multistage two-step fraught in phase scheme for problems in mathematical chemistry

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