Abstract
This paper presents a new technique for numerical treatments of Volterra delay integro-differential equations that have many applications in biological and physical sciences. The technique is based on the mono-implicit Runge — Kutta method (described in [12]) for treating the differential part and the collocation method (using Boole's quadrature rule) for treating the integral part. The efficiency and stability properties of this technique have been studied. Numerical results are presented to demonstrate the effectiveness of the methodology. © 2009, Institute of Mathematics, NAS of Belarus. All rights reserved.
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Rihan, F. R., Doha, E. H., Hassan, M. I., & Kamel, N. M. (2009). Numerical Treatments for Volterra Delay Integro-Differential Equations. Computational Methods in Applied Mathematics, 9(3), 292–318. https://doi.org/10.2478/cmam-2009-0018
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