A new equivalence of Stefan's problems for the Time-Fractional-Diffusion Equation

Abstract

A fractional Stefan problem with a boundary convective condition is solved, where the fractional derivative of order α ∈ (0,1) is taken in the Caputo sense. Then an equivalence with other two fractional Stefan problems (the first one with a constant condition on x = 0 and the second with a flux condition)is proved and the convergence to the classical solutions is analyzed when α 1 recovering the heat equation with its respective Stefan condition.