In this paper fast implicit and explicit Runge–Kutta methods for systems of Volterra integral equations of Hammerstein type are constructed. The coefficients of the methods are expressed in terms of the values of the Laplace transform of the kernel. These methods have been suitably constructed in order to be implemented in an efficient way, thus leading to a very low computational cost both in time and in space. The order of convergence of the constructed methods is studied. The numerical experiments confirm the expected accuracy and computational cost.
Fast Runge-Kutta methods for nonlinear systems of Volterra Integral equations, in stampa su BIT / G., Capobianco; D., Conte; DEL PRETE, Ida; Russo, Elvira. - In: BIT. - ISSN 0006-3835. - STAMPA. - 47/2:2(2007), pp. 259-275. [10.1007/s10543-007-0120-5]
Fast Runge-Kutta methods for nonlinear systems of Volterra Integral equations, in stampa su BIT
DEL PRETE, IDA;RUSSO, ELVIRA
2007
Abstract
In this paper fast implicit and explicit Runge–Kutta methods for systems of Volterra integral equations of Hammerstein type are constructed. The coefficients of the methods are expressed in terms of the values of the Laplace transform of the kernel. These methods have been suitably constructed in order to be implemented in an efficient way, thus leading to a very low computational cost both in time and in space. The order of convergence of the constructed methods is studied. The numerical experiments confirm the expected accuracy and computational cost.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
