Carmen Da Silva scite author profile

The segmented formulation of the Tau method is used to numerically solve the non-autonomous forward-backward functional differential equationwhere x is the unknown function, a, b, and c are known functions. The step by step Tau method is applied to approximate the solution of this equation by a piecewise polynomial function. A boundary value problem is posed, numerically solved, and analyzed. Also, a novel way to generate a set of non-autonomous problems with known analytical solution is provided. From it, several nonautonomous problems were constructed and resolved with the proposed method. We conclude that the good numerical results obtained in our numerical experimentation and the relative simplicity of the Tau method demonstrate that it is a promising strategy for numerically solving mixed-type problems, as presented here.

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Carmen Da Silva

Segmented Tau approximation for a forward–backward functional differential equation

Segmented Tau Approximation for a Non-Autonomous Functional Differential Equation of Mixed Type

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