Abstract
We study the numerical approximation of solutions for parabolic
integro-differential equations (PIDE). Similar models arise in option pricing,
to generalize the Black-Scholes equation, when the processes which
generate the underlying stock returns may contain both a continuous part
and jumps. Due to the non-local nature of the integral term, unconditionally
stable implicit difference schemes are not practically feasible. Here we
propose using implicit-explicit (IMEX) Runge-Kutta methods for the time
integration to solve the integral term explicitly, giving higher-order accuracy
schemes under weak stability time-step restrictions. Numerical tests
are presented to show the computational efficiency of the approximation.
Anno
2007
Autori IAC
Tipo pubblicazione
Altri Autori
Briani M., Natalini R., Russo G.
Editore
Springer Verlag Italia
Rivista
Calcolo (Testo stamp.)