Lie symmetry classification of time-fractional telegraph systems with variable coefficients identifies three symmetry classes depending on the relation between transport coefficient and potential, and produces exact invariant solutions in Mittag-Leffler, generalized Wright, and Fox H-functions.
The fractional derivative with respect to another function and its application to lie symmetry analysis.Chaos, Solitons & Fractals, 170:113335
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Lie symmetry classification and invariant solutions of time-fractional telegraph systems with variable coefficients
Lie symmetry classification of time-fractional telegraph systems with variable coefficients identifies three symmetry classes depending on the relation between transport coefficient and potential, and produces exact invariant solutions in Mittag-Leffler, generalized Wright, and Fox H-functions.