Fractional Diffusion-Telegraph Equations and their Associated Stochastic Solutions
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We present the stochastic solution to a generalized fractional partial differential equation involving a regularized operator related to the so-called Prabhakar operator and admitting, amongst others, as specific cases the fractional diffusion equation and the fractional telegraph equation. The stochastic solution is expressed as a L\'evy process time-changed with the inverse process to a linear combination of (possibly subordinated) independent stable subordinators of different indices. Furthermore a related SDE is derived and discussed.
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An Inverse Source Problem For a Time-Fractional Mixed Wave-Diffusion-Wave Equation in a Cylindrical Domain
Existence of a solution is proved for the inverse source problem of a variable-order time-fractional mixed PDE in a cylinder via separation of variables and Bessel series convergence analysis.
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