Existence of solutions of some impulsive fractional integrodifferential equations (Q2910702)

This paper deals with the existence of solutions of some impulsive fractional integrodifferential equations with finite number of impulses: NEWLINE\[NEWLINED^{\alpha}u(t) = f(t, u(t), \int_{t_0}^t a(t -s)g(t, u(t))dt);\quad t \in [t_0, a],\;t \neq t_k,\;k = 1, \dots, m, NEWLINE\]NEWLINE with the initial condition NEWLINE\[NEWLINED^{\alpha-1}u(t_0) = u_0;\quad (t - t_0)^{1-\alpha}u(t)|_{t=t_0} = \frac{u_0}{\Gamma(\alpha)}, NEWLINE\]NEWLINE and subject to the impulsive conditions NEWLINE\[NEWLINE D^{\alpha-1}(u(t_k^+) - u(t_k^-)) = I_k(t);\quad t = t_k,\;k = 1, 2, \dots, m; NEWLINE\]NEWLINE NEWLINE\[NEWLINE (t - t_k)^{1-\alpha}u(t^+)|_{t=t_k} = \frac{I_k(t_k)}{\Gamma(\alpha)},\quad k = 1, \dots NEWLINE\]NEWLINE The existence and uniqueness of local solutions and global solutions are established via the Schauder's fixed point theorem and the Brouwer's fixed point theorem, respectively.