Solutions of a Nonlinear Boundary Value Problem with a Large Parameter

We consider solutions of boundary value problems for the ordinary differential equation. \(y^{\prime n}=f\left(x, y, y^{\prime}, \ldots, y^{\prime n}{ }^{\prime \prime}\right)\), which satisfy \(g_{i}\left(y(x), \ldots, y^{\prime n}{ }^{11}\left(x_{i}\right)\right)=y_{i}\), \(1 \leqslant i \leqslant

In this paper, we establish existence and multiplicity results for the problem Ž . Ž. w x Ž . Ž . xЉ q x q f t, x, xЈ s s t a.e. in 0, ; x 0 s x s ␥ , under the Ambrosetti᎐Prodi type condition, with f being a Caratheodory function.

We study the existence of positive solutions to the boundary-value problem u + a t f u = 0 t∈ 0 1 i=1 a i < 1, and m-2 i=1 b i < 1. We show the existence of at least one positive solution if f is either superlinear or sublinear by applying the fixed point theorem in cones.