An existence result for the Shabat equation

We establish the existence and uniqueness of solution for the boundary value problem Riemann-Liouville derivative of order α ∈ (0, 1) and λ > 1. Our result might be useful for establishing a non-integer variant of the Atkinson classical theorem on the oscillation of Emden-Fowler equations.

We consider the optimization problem min[F( g): g # X(0)], where F( g) is a variational energy associated to the obstacle g and the class X(0) of admissible obstacles is given by X(0)=[g: 0 Ä R : g on 0, 0 g dx=c] with # W 1, p 0 (0) and c # R fixed. Generally, this problem does not have a solution

We use the nonlinear alternative and topological transversality to prove an existence theorem for the solutions of the functional differential equation ẋ(t) = F (t, x t ), where x t (θ ) = x(t + θ ) for all θ ∈ [-r, 0] and F : [0, A] × X 2 → X , X is a Banach space and X 2 is the Banach space of con