Abstract
In this paper we study the Cauchy problem of the multivalued fractional differential equation
d(proportional to) x(t)/dt(proportional to) is an element of F(t, x(t)) a.e. on I = [0, T], alpha is an element of R(+)
as a consequent result of the study of the Cauchy problem of the fractional differential equation
d(proportional to) x(t)/dt(proportional to) = f(t, x(t)), t is an element of I, alpha is an element of R(+)
in the Banach space E, where F(t, x(t)) is a set-valued function defined on I x E. The existence and some other properties of the solution will be proved. Continuation of the problem to the Cauchy problem of the multivalued differential equation d(n)x(t)/dt(n) is an element of F(t, x(t)) a.e. on I, and n = 1, 2,..., will be established.