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this paper devoted to study the existence of a unique solution of the fractional Hammerstein integro-differential equations in the Banach space via the fixed point theorems. The main purpose is based on transforming the fractional equations into the integral equations of the Volterra type by using the differential transformation method and the corresponding fractional calculus characteristics. Also, we obtain the ε-modified operational matrix for the fractional integral and use the properties of modified block pulse functions to get approximate solutions. In the our presented method, the fractional Hammerstein equations are transformed into a system of algebraic equations, where the volume of computations are reduced by using the special nodes. Finally, we give some examples to demonstrate the obtained results.

Somayyeh Dadsetadi, Kazem Nouri. (2020) Analytical and Numerical Investigation of the Hammerstein Fractional Equations, Punjab University Journal of Mathematics, Volume 52 , Issue No.1.
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