A finite difference pair with improved phase and stability properties

New hybrid two-step method with optimized phase and stability characteristics ⋮ New Runge-Kutta type symmetric two-step method with optimized characteristics ⋮ 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 ⋮ 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 ⋮ New five-stages finite difference pair with optimized phase properties ⋮ A five-stages symmetric method with improved phase properties ⋮ New five-stages two-step method with improved characteristics ⋮ 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 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 ⋮ New multiple stages two-step complete in phase algorithm with improved characteristics 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 ⋮ 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 ⋮ A hybrid finite difference pair with maximum phase and stability properties ⋮ New finite difference pair with optimized phase and stability properties ⋮ 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 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 ⋮ 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 new two-step finite difference pair with optimal properties ⋮ 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 ⋮ 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 ⋮ Algorithm for the development of families of numerical methods based on phase-lag Taylor series ⋮ A phase fitted FinDiff process for DifEquns in quantum chemistry ⋮ A complete in phase FinitDiff procedure for DiffEquns in chemistry ⋮ 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 ⋮ A multistage two-step fraught in phase scheme for problems in mathematical chemistry ⋮ An efficient and fully explicit model to simulate delayed activator-inhibitor systems with anomalous diffusion ⋮ A Runge-Kutta type crowded in phase algorithm for quantum chemistry problems ⋮ Phase fitted method for quantum chemistry 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 approach on the construction of trigonometrically fitted two step hybrid methods
• 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
• A new four stages symmetric two-step method with vanished phase-lag and its first derivative for the numerical integration of the Schrödinger equation
• Construction of exponentially fitted symplectic Runge-Kutta-Nyström methods from partitioned Runge-Kutta methods
• An optimized two-step hybrid block method for solving general second order initial-value problems
• 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 high-order two-step phase-fitted method for the numerical 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
• The use of phase lag and amplification error derivatives for the construction of a modified Runge-Kutta-Nyström method
• A new family of symmetric linear four-step methods for the efficient integration of the Schrödinger equation and related oscillatory problems
• A parametric symmetric linear four-step method for the efficient integration of the Schrödinger equation and related oscillatory problems
• New stable closed Newton-Cotes trigonometrically fitted formulae for long-time integration
• Optimizing a hybrid two-step method for the numerical solution of the Schrödinger equation and related problems with respect to phase-lag
• 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
• A family of explicit linear six-step methods with vanished phase-lag and its first derivative
• 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
• An eight-step semi-embedded predictor-corrector method for orbital problems and related IVPs with oscillatory solutions for which the frequency is unknown
• 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
• An efficient numerical method for the solution of the Schrödinger equation
• New modified Runge-Kutta-Nyström methods for the numerical integration of the Schrödinger equation
• Construction of an optimized explicit Runge-Kutta-Nyström method for the numerical solution of oscillatory initial value problems
• On modified Runge-Kutta trees and methods
• A dissipative exponentially-fitted method for the numerical solution of the Schrödinger equation and related problems
• High order closed Newton-Cotes exponentially and trigonometrically fitted formulae as multilayer symplectic integrators and their application to the radial Schrödinger equation
• Closed Newton-Cotes trigonometrically-fitted formulae of high order for long-time integration of orbital problems
• A four-step phase-fitted method for the numerical integration of second order initial-value problems
• High-order P-stable multistep methods
• Two optimized symmetric eight-step implicit methods for initial-value problems with oscillating solutions
• 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
• Exponentially and trigonometrically fitted methods for the 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
• Phase properties of high order, almost P-stable formulae
• A variable step method for the numerical integration of the one- dimensional Schrödinger equation
• A Noumerov-type method with minimal phase-lag for the integration of second order periodic initial-value problems. II: Explicit method
• A family of embedded Runge-Kutta formulae
• A finite-difference method for the numerical solution of the Schrödinger equation
• Newton--Cotes formulae for long-time integration.
• Symplectic integrators for the numerical solution of the Schrödinger equation
• A generator of hybrid symmetric four-step methods for the numerical solution of the Schrödinger equation
• Trigonometrically fitted predictor--corrector methods for IVPs with oscillating solutions
• Zero dissipative, explicit Numerov-type methods for second order IVPs with oscillating solutions
• An exponentially-fitted and trigonometrically-fitted method for the numerical solution of periodic initial-value problems.
• A four stages numerical pair with optimal phase and stability properties
• Dissipative trigonometrically-fitted methods for linear second-order IVPs with oscillating solution.
• An optimized Runge-Kutta method for the solution of orbital problems
• A fourth algebraic order trigonometrically fitted predictor-corrector scheme for IVPs with oscillating solutions
• Multiderivative methods of eighth algebraic order with minimal phase-lag for the numerical solution of the radial Schrödinger equation
• Runge-Kutta methods with minimal dispersion and dissipation for problems arising from computational acoustics
• An explicit sixth-order method with phase-lag of order eight for \(y=f(t,y)\)
• Comparison of some four-step methods for the numerical 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
• Two-step high order hybrid explicit method for the numerical solution of the Schrödinger equation
• Optimization as a function of the phase-lag order of nonlinear explicit two-step \(P\)-stable method for linear periodic IVPs
• A Runge-Kutta type implicit high algebraic order two-step method with vanished phase-lag and its first, second, third and fourth derivatives for the numerical solution of coupled differential equations arising from the Schrödinger equation
• A predictor-corrector explicit four-step method with vanished phase-lag and its first, second and third derivatives for the numerical integration of the Schrödinger equation
• Phase-fitted Runge-Kutta pairs of orders 8(7)
• An economical eighth-order method for the approximation of the solution of the Schrödinger equation
• An efficient and computational effective method for second order problems
• A family of high-order multistep methods with vanished phase-lag and its derivatives for the numerical solution of the Schrödinger equation
• The numerical solution of coupled differential equations arising from the Schrödinger equation
• Stabilization of Cowell's method
• Chebyshevian multistep methods for ordinary differential equations
• Families of Runge-Kutta-Nystrom Formulae
• Evolutionary generation of high-order, explicit, two-step methods for second-order linear IVPs
• Symmetric Multistip Methods for Periodic Initial Value Problems
• Modified two‐step hybrid methods for the numerical integration of oscillatory problems
• A new high algebraic order efficient finite difference method for the solution of the Schrödinger equation