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Abstract
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Based on Jacobi wavelets polynomials, an operational method is proposed to solve the generalized Abels integral equations. An approximation of the unknown function is considered in terms of Jacobi wavelets functions with unknown coefficients, which must be determined. By substituting this approximation into the equation, a system of linear algebraic equations is obtained. The applicability of earlier numerical inversion methods was restricted to the one portion of generalized Abel integral equations. The proposed method is quite accurate. Numerical example is given to illustrate the applicability, efficiency, and accuracy of the new scheme
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