Advances in Mathematical Physics (Jan 2015)
On the Nonlinear Fractional Differential Equations with Caputo Sequential Fractional Derivative
Abstract
The purpose of this paper is to investigate the existence of solutions to the following initial value problem for nonlinear fractional differential equation involving Caputo sequential fractional derivative Dc0α2Dc0α1yxp-2Dc0α1yx=fx,yx, x>0, y(0)=b0, Dc0α1y(0)=b1, where Dc0α1, Dc0α2 are Caputo fractional derivatives, 01, and b0,b1∈R. Local existence of solutions is established by employing Schauder fixed point theorem. Then a growth condition imposed to f guarantees not only the global existence of solutions on the interval [0,+∞), but also the fact that the intervals of existence of solutions with any fixed initial value can be extended to [0,+∞). Three illustrative examples are also presented. Existence results for initial value problems of ordinary differential equations with p-Laplacian on the half-axis follow as a special case of our results.
