A Survey of Interval Runge–Kutta and Multistep Methods for Solving the Initial Value Problem

“…. , n − 1) one can obtain by applying an interval one-step method, for example an interval method of Runge-Kutta type (see, e.g., [7,8,20,27,31,43]) or interval methods based on Taylor series (see, e.g., [2,3,5,15,21,39]). Let us note that in (10), we cannot write γ * n + γ * * n n instead of γ * n n + γ * * n n , because in general γ * n + γ * * n may be different from γ * n + γ * * n .…”

“….9] and let us take additional starting intervals presented in Table 5 (these intervals have been obtained by an interval version of conventional fourth order Runge-Kutta method [7,20,27,43] with h = 0.0001). In Table 6, we present the results obtained at t = 1 by the methods N4 and M4.…”

“…h = 0.0001, and taking additional starting intervals given in Table 10 (these intervals have been obtained by an interval version of conventional fourth order Runge-Kutta method [7,20,27,43] with h = 0.00001), we have obtained by the M4 method the results presented in Table 11. If the integration interval is sufficiently small, the results obtained by the low (fourth) order N4 and M4 methods can be compared with the results obtained by methods based on high-order Tylor series.…”

“…The first one was described by R. E. Moore in 1965 [33][34][35]. There are also known interval methods based on high-order Taylor series (see, e.g., [2,3,5,15,21,39,41]), explicit and implicit Runge-Kutta methods [7,8,20,24,27,31,43], explicit and implicit multistep methods [17-19, 25-27, 30, 43]. The last ones concern interval methods based on conventional methods of Adams-Bashforth, Adams-Moulton, Nyström, and Milne-Simpson types.…”

Interval versions of Milne’s multistep methods

“…. , n − 1) one can obtain by applying an interval one-step method, for example an interval method of Runge-Kutta type (see, e.g., [7,8,20,27,31,43]) or interval methods based on Taylor series (see, e.g., [2,3,5,15,21,39]). Let us note that in (10), we cannot write γ * n + γ * * n n instead of γ * n n + γ * * n n , because in general γ * n + γ * * n may be different from γ * n + γ * * n .…”

“….9] and let us take additional starting intervals presented in Table 5 (these intervals have been obtained by an interval version of conventional fourth order Runge-Kutta method [7,20,27,43] with h = 0.0001). In Table 6, we present the results obtained at t = 1 by the methods N4 and M4.…”

“…h = 0.0001, and taking additional starting intervals given in Table 10 (these intervals have been obtained by an interval version of conventional fourth order Runge-Kutta method [7,20,27,43] with h = 0.00001), we have obtained by the M4 method the results presented in Table 11. If the integration interval is sufficiently small, the results obtained by the low (fourth) order N4 and M4 methods can be compared with the results obtained by methods based on high-order Tylor series.…”

“…The first one was described by R. E. Moore in 1965 [33][34][35]. There are also known interval methods based on high-order Taylor series (see, e.g., [2,3,5,15,21,39,41]), explicit and implicit Runge-Kutta methods [7,8,20,24,27,31,43], explicit and implicit multistep methods [17-19, 25-27, 30, 43]. The last ones concern interval methods based on conventional methods of Adams-Bashforth, Adams-Moulton, Nyström, and Milne-Simpson types.…”

Interval versions of Milne’s multistep methods

“…An interval method for ordinary differential equations using interval arithmetic was described first by R. E. Moore in 1965 [32,33]. There are also interval methods based on explicit Runge-Kutta methods [21,28,41] and implicit ones [10,11,25,28,31]. In [41], Yu.…”

On interval predictor-corrector methods

Applications of Interval B&BT Methods