Trigonometrically-fitted method with the Fourier frequency spectrum for undamped Duffing equation

A new finite difference method with optimal phase and stability properties for problems in chemistry ⋮ Efficient FinDiff algorithm with optimal phase properties for problems in quantum chemistry ⋮ New FD methods with phase-lag and its derivatives equal to zero for periodic initial value problems ⋮ A new method with vanished phase-lag and its derivatives of the highest order for problems in quantum chemistry ⋮ A new FinDiff numerical scheme with phase-lag and its derivatives equal to zero for periodic initial value problems ⋮ New FD scheme with vanished phase-lag and its derivatives up to order six for problems in chemistry ⋮ A new algorithm with eliminated phase-lag and its derivatives up to order five for problems in quantum chemistry ⋮ An explicit Numerov-type method for second-order differential equations with oscillating solutions ⋮ A multistep method with optimal phase and stability properties for problems in quantum chemistry ⋮ A multistep conditionally P-stable method with phase properties of high order for problems in quantum chemistry ⋮ A phase-fitting and first derivative phase-fitting singularly P-stable economical two-step method for problems in quantum chemistry ⋮ A phase-fitting, first and second derivatives phase-fitting singularly P-stable economical two-step method for problems in chemistry ⋮ A phase-fitting, first, second and third derivatives phase-fitting singularly P-stable economical two-step method for problems in quantum chemistry ⋮ A phase fitted FiniteDiffr process for DiffrntEqutns in chemistry ⋮ A complete in phase FiniteDiffrnc algorithm for DiffrntEqutins in chemistry ⋮ Full in phase finite difference algorithm for differential equations in quantum chemistry ⋮ Solution of quantum chemical problems using an extremely successful and reasonably cost two-step, fourteenth-order phase-fitting approach ⋮ Solution of quantum chemical problems by a very effective and relatively inexpensive two-step, fourteenth-order, phase-fitting procedure ⋮ Phase-fitting, singularly P-stable, cost-effective two-step approach to solving problems in quantum chemistry with vanishing phase-lag derivatives up to order 6 ⋮ Two-step, fourteenth-order, phase-fitting procedure with high efficiency and minimal cost for chemical problems ⋮ Highly efficient, singularly P-stable, and low-cost phase-fitting two-step method of 14th order for problems in chemistry ⋮ An exceedingly effective and inexpensive two-step, fourteenth-order phase-fitting method for solving quantum chemical issues ⋮ Phase fitted algorithm for problems in quantum chemistry ⋮ A finite difference method with zero phase-lag and its derivatives for quantum chemistry problems ⋮ Complete in phase method for problems in chemistry ⋮ A finite difference method with phase-lag and its derivatives equal to zero for problems in chemistry ⋮ Solution to quantum chemistry problems using a phase-fitting, singularly P-stable, cost-effective two-step approach with disappearing phase-lag derivatives up to order 5 ⋮ Two-step method with vanished phase-lag and its derivatives for problems in quantum chemistry: an economical case ⋮ An economical two-step method with optimal phase and stability properties for problems in chemistry ⋮ Obrechkoff one-step method fitted with Fourier spectrum for undamped Duffing equation ⋮ An accomplished phase FD process for DEs in chemistry ⋮ A new economical method with eliminated phase-lag and its derivative for problems in chemistry ⋮ A new method with improved phase-lag and stability properties for problems in quantum chemistry - an economical case ⋮ An economical two-step method with improved phase and stability properties for problems in chemistry ⋮ A new improved economical finite difference method for problems in quantum chemistry ⋮ An integrated in phase FD procedure for DiffEqns in chemical problems ⋮ A phase fitted FinDiff process for DifEquns in quantum chemistry ⋮ A complete in phase FinitDiff procedure for DiffEquns in chemistry ⋮ Obrechkoff two-step method fitted with Fourier spectrum for undamped Duffing equation ⋮ A phase-fitting singularly P-stable economical two-step method for problems in quantum chemistry ⋮ A singularly P-stable two-step method with improved characteristics for problems in chemistry ⋮ Phase fitted method for quantum chemistry problems ⋮ A two-step modified explicit hybrid method with step-size-dependent parameters for oscillatory problems ⋮ A phase-fitting singularly P-stable cost-effective two-step method for solving chemistry problems ⋮ A perfect in phase FD algorithm for problems in quantum chemistry ⋮ A multiple stage absolute in phase scheme for chemistry problems ⋮ A two-step method singularly P-Stable with improved properties for problems in quantum chemistry ⋮ A two-step singularly P-Stable method with high phase and large stability properties for problems in chemistry

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• A new high efficient and high accurate Obrechkoff four-step method for the periodic nonlinear undamped Duffing's equation
• Importance of the first-order derivative formula in the Obrechkoff method
• A new effective algorithm for the resonant state of a Schrödinger equation
• A trigonometrically-fitted one-step method with multi-derivative for the numerical solution to the one-dimensional Schrödinger equation
• P-stable linear symmetric multistep methods for periodic initial-value problems
• Nonlinear oscillations, dynamical systems, and bifurcations of vector fields
• Families of two-step fourth order \(P\)-stable methods for second order differential equations
• A modification of the Stiefel-Bettis method for nonlinearly damped oscillators
• Adaptive methods for periodic initial value problems of second order differential equations
• Stabilization of Cowell's classical finite difference method for numerical integration
• Unconditionally stable methods for second order differential equations
• Chebyshevian multistep methods for ordinary differential equations
• A four-step trigonometric fitted P-stable Obrechkoff method for periodic initial-value problems
• P-Stable Obrechkoff Methods with Minimal Phase-Lag for Periodic Initial Value Problems
• Generalization of the method of slowly varying amplitude and phase to non-linear oscillatory systems with two degrees of freedom
• Symmetric Multistip Methods for Periodic Initial Value Problems
• A P-stable complete in phase Obrechkoff trigonometric fitted method for periodic initial-value problems