Rh Wavelet Bases to Approximate Solution of Nonlinear Volterra - Fredholm - Hammerstein Integral Equations with Error Analysis
نویسندگان
چکیده
In this paper, we present a method for calculated the numerical approximation of nonlinear Fredholm Volterra Hammerstein integral equation, which uses the properties of rationalized Haar wavelets. The main tool for error analysis is the Banach fixed point theorem. An upper bound for the error was obtained and the order of convergence is analyzed. An algorithm is presented to compute and illustrate the solutions for some numerical examples.
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