Existence and iteration of monotone positive solutions for third-order nonlocal BVPs involving integral conditions

This paper is concerned with the existence of monotone positive solution for the following third-order nonlocal boundary value problem u 000 (t)+f (t,u (t),u 0 (t)) = 0, 0 < t < 1; u (0) = 0, au 0 (0) − bu 00 (0) = [u], cu 0 (1) + du 00 (1) = [u], where f 2 C([0, 1] R + R + ,R + ), [u] = R 1 0 u(t)dA(t) and [u] = R 1 0 u(t)dB(t) are linear functionals on C[0, 1] given by Riemann-Stieltjes integrals. By applying monotone iterative techniques, we not only obtain the existence of monotone positive solution but also establish an iterative scheme for approximating the solution. An example is also included to illustrate the main