Existence-uniqueness theorems for three-point boundary value problems for nth-order nonlinear differential equations

## Abstract For the __n__th order nonlinear differential equation, __y__^(__n__)^ = __f__(__x__, __y__, __y__′, …, __y__^(__n__−1)^), we consider uniqueness implies existence results for solutions satisfying certain (__k__ + __j__)‐point boundary conditions, 1 ⩽ __j__ ⩽ __n__ − 1, and 1 ⩽ __k__ ⩽ _

In this paper we consider a nonlinear two-point boundary value problem for second order differential inclusions. Using the Leray Schauder principle and its multivalued analog due to Dugundji Granas, we prove existence theorems for convex and nonconvex problems. Our results are quite general and inco

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.