On mixed collocation methods for Volterra integral equations with periodic solution

We study the application of the so-called mixed interpolation methods derived by De Meyer. Vanthournout and Vanden Berghe (1990) in the numerical solution of Volterra integro-differential equations of first and second order with periodic solutions. The existence of periodic solutions is examined and

This paper presents a computational technique for the solution of the nonlinear mixed Volterra-Fredholm-Hammerstein integral equations. The method is based on the composite collocation method. The properties of hybrid of block-pulse functions and Lagrange polynomials are discussed and utilized to de

We discuss the convergence properties of spline collocation and iterated collocation methods for a weakly singular Volterra integral equation associated with certain heat conduction problems. This work completes the previous studies of numerical methods for this type of equations with noncompact ker

In this paper we give a complete analysis of convergence acceleration method for discrete collocation solutions of Volterra integral equations with constant delay. It will be shown that, when continuous piecewise polynomials of degree m 2 are used, and collocation is based on the Lobatto points, thi