Existence of solutions to some classes of partial fractional differential equations (Q732560)

The author studies the existence of a unique solution for the problem \[ \frac{d^{\nu}}{dt^{\nu}}\,(\phi+f(t,B\phi(t)))=A\phi(t)+g(t,C\phi(t)),\quad t\in (0,T] \text{ and } \phi(0)=\phi_o.\tag{1} \] He proves that (1) can be written as the integral equation \[ \phi(t)=f(0,B\phi_o)-f(t,B\phi(t))+\phi_o+I^{\nu}A\phi(t)+I^{\nu} g(t,C\phi(t)),\quad t\in [0,T].\tag{2} \] Then he proves, under his stated assumptions, that the integral equation (2) has a unique solution. Unfortunately this result is true only for the integral equation (2) because the author did not complete the proof of the equivalence between the problem (1) and the integral equation (2) which can not be proved under the stated conditions.