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Abstract
This article discusses a multiderivative collocation method for direct solution of the general initial-value problems of ordinary differential equations of the form y ( n )(x) = f(x, y, y′, y′, …, y n −1), y(a) = y 0, y i (a) = y i , i = 1, 2, 3. To ensure the symmetry of the method, collocation of the differential system has been taken at the selected grid points. Furthermore, a predictor for the calculation of the value of y n + k and its derivatives that appear in the main method is developed. Taylor series expansion is used to calculate the values of y n + i , i = 1, 2, 3 and their derivatives which also appear in the main method. The interval of periodicity and the error constant of the method at x = x n + k are calculated. Evaluation of the proposed method at x = x n + k gives a particular discrete scheme as a special case of the method. Finally, the efficiency of the method is tested on non-stiff initial-value problems.
