Abstract
In this work, we prove the existence of integrable solutions for the following generalized mixed-type nonlinear functional integral equation
x(t) = g(t, (tx)(t)) + f(t. integral(t)(0) k(t, s)u(t, s, (Qx)(s)) ds), t is an element of [0, infinity).
Our result is established by means of a Krasnosel'skii type fixed point theorem proved by Taoudi (2009). In the last section we give an example to illustrate our result. (C) 2015 Elsevier Inc. All rights reserved.