Stability analysis of Volterra-Runge-Kutta methods based on the basic test equation of the form. y(t)=1+λ∫0ty(s) ds (t≥0),where λ is a complex parameter, and on the convolution test equation. y(t)=1+∫0t[λ+σ(t-s)]y(s)ds (t≥0),where λ and σ are real parameters, is presented. General stability conditions are derived and applied to construct numerical methods with good stability properties. In particular, a family of second-order Vo-stable Volterra-Runge-Kutta methods is obtained. No Vo-stable methods of order greater than one have been presented previously in the literature
Stability analysis of Runge-kutta methods for Volterra integral equations of the second kind
VERMIGLIO, Rossana;
1990-01-01
Abstract
Stability analysis of Volterra-Runge-Kutta methods based on the basic test equation of the form. y(t)=1+λ∫0ty(s) ds (t≥0),where λ is a complex parameter, and on the convolution test equation. y(t)=1+∫0t[λ+σ(t-s)]y(s)ds (t≥0),where λ and σ are real parameters, is presented. General stability conditions are derived and applied to construct numerical methods with good stability properties. In particular, a family of second-order Vo-stable Volterra-Runge-Kutta methods is obtained. No Vo-stable methods of order greater than one have been presented previously in the literatureFile in questo prodotto:
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