Functionally fitted Runge-Kutta-Nyström methods

Abstract: Abstract. We have shown previously that functionally fitted Runge-Kutta (FRK) methods can be studied using a convenient collocation framework. Here, we extend that framework to functionally fitted Runge-Kutta-Nyström (FRKN) methods, shedding further light on the fact that these methods can integrate a second-order differential equation exactly if its solution is a combination of certain basis functions, and that superconvergence can be obtained when the collocation points satisfy some orthogonality conditions.… Show more

“…Thus, the first equation in (15) holds. The other equations in (15) are obtained similarly. Theorem 3.3 is proved.…”

“…However, for general basis functions, the coefficients A, b, and d of a FEPTRKN method depend on both t and h and we do not have d T e = 1 and b T e = 1 2 . The coefficients b(t n , h), d(t n , h), and A(t n , h) are independent of t n for the so-called class of separable basis functions {u i } s i=1 , i.e., if we have (see [15,Section 3])…”

Functionally-fitted explicit pseudo two-step Runge–Kutta–Nyström methods

“…Thus, the first equation in (15) holds. The other equations in (15) are obtained similarly. Theorem 3.3 is proved.…”

“…However, for general basis functions, the coefficients A, b, and d of a FEPTRKN method depend on both t and h and we do not have d T e = 1 and b T e = 1 2 . The coefficients b(t n , h), d(t n , h), and A(t n , h) are independent of t n for the so-called class of separable basis functions {u i } s i=1 , i.e., if we have (see [15,Section 3])…”

Functionally-fitted explicit pseudo two-step Runge–Kutta–Nyström methods

Energy-preserving trigonometrically fitted continuous stage Runge-Kutta-Nyström methods for oscillatory Hamiltonian systems

Trigonometrically fitted multi-step RKN methods for second-order oscillatory initial value problems