A solution to boundary value problems with over-specified boundary conditions

## Abstract We investigate some classes of eigenvalue dependent boundary value problems of the form equation image where __A__ ⊂ __A__^+^ is a symmetric operator or relation in a Krein space __K__, __τ__ is a matrix function and Γ~0~, Γ~1~ are abstract boundary mappings. It is assumed that __A__

In this paper, the upper and lower solution method and Schauder's fixed point theorem are employed in the study of boundary value problems for a class of second-order impulsive ordinary differential equations with nonlinear boundary conditions. We prove the existence of solutions to the problem unde

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

This paper investigates the existence and multiplicity of positive solutions for a class of nonlinear boundary-value problems of fourth-order differential equations with integral boundary conditions. The arguments are based upon a specially constructed cone and the fixed-point theory in cone. The no

A simple numerical method for construction of the dependence of solutions to nonlinear boundary value problem on a parameter will be developed. The set of differential equations is diiferentiated with respect to the boundary condition chosen and the resulting partial differential equations are solve