An existence theorem for second order ordinary differential systems with nonlinear mixed boundary conditions

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

## Abstract In this paper we deal with boundary value problems equation image where __l__ : __C__^1^([__a, b__], ℝ^__k__^) → ℝ^__k__^ × ℝ^__k__^ is continuous, __μ__ ≤ 0 and __φ__ is a Caratheodory map. We define the class __S__ of maps __l__, for which a global bifurcation theorem holds for the

Left definite theory of regular self-adjoint operators in a Sobolev space was developed a rew years ago when the boundary conditions were separated, the separation being necessary in order to properly define the Sobolev inner product. We show how this may be extended when the boundary conditions are

The fourth-order differential equation with the four-point boundary value problem is studied in this work, where 0 ≤ ξ 1 < ξ 2 ≤ 1. Some results on the existence of at least one positive solution to the above four-point boundary value problem are obtained by using the Krasnoselskii fixed point the