In this paper, the solution of a multi-order, multi-degree-of-freedom fractional differential equation is addressed by using the Mellin integral transform. By taking advantage of a technique that relates the transformed function, in points of the complex plane differing in the value of their real part, the solution is found in the Mellin domain by solving a linear set of algebraic equations. The approximate solution of the differential (or integral) equation is restored, in the time domain, by using the inverse Mellin transform in its discretized form.
Butera, S., Di Paola, M. (2015). Mellin transform approach for the solution of coupled systems of fractional differential equations. COMMUNICATIONS IN NONLINEAR SCIENCE & NUMERICAL SIMULATION, 20 [10.1016/j.cnsns.2014.04.024].
Mellin transform approach for the solution of coupled systems of fractional differential equations
DI PAOLA, Mario
2015-01-01
Abstract
In this paper, the solution of a multi-order, multi-degree-of-freedom fractional differential equation is addressed by using the Mellin integral transform. By taking advantage of a technique that relates the transformed function, in points of the complex plane differing in the value of their real part, the solution is found in the Mellin domain by solving a linear set of algebraic equations. The approximate solution of the differential (or integral) equation is restored, in the time domain, by using the inverse Mellin transform in its discretized form.
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