Existence of three solutions to a second-order nonhomogeneous multipoint boundary-value problem

The existence, nonexistence, and multiplicity of nonnegative solutions are established for the three-point boundary value problem where β ∈ (0, 1), α ∈ (0, 1/β), and λ is a nonnegative parameter, under appropriate hypotheses. The key idea is that the problem of finding a nonnegative solution is tra

In this paper, a new fixed-point theorem of functional type in a cone is established. With using the new fixed-point theorem and imposing growth conditions on the nonlinearity, the existence of three positive solutions for the boundary value problem x"(O+f(t,x(t),x'(t))=O , 0<t<l, x(0) = x(1) = 0,

This paper is concerned with the existence of positive solutions to the nonhomogeneous three-point boundary value problem of the second-order ordinary differential equation satisfying that there exists x 0 ∈ [0, 1] such that h(x 0 ) > 0, and f ∈ C([0, ∞), [0, ∞)). By applying Krasnosel'skii's fixed

Existence results for the second-order three-point boundary value problem Ž . Ž . Ž . Ž . Ž . xЉ s f t, x, xЈ , x 0 s A, x y x 1 s y 1 B, 0 --1, are presented. Our analysis is based on a Nonlinear Alternative of Leray-Schauder.