Solution of two-point boundary value problems using splines

We improve the results obtained by Erbe, Hu, and Wang in a recent paper. We show that there exist at least two positive solutions of two-point boundary value problems under conditions weaker than those used by Erbe, Hu, and Wang.

Suppose that h g L 0, , g g C R, R , and lim g t rt s 0. With the Saddle Point Theorem, the solvability is proved for the two-point boundary value problem under the condition that F y ϱsin x dxh x sin x dx -F qϱ sin x dx,

We study upper and lower bounds on the worst-case e-complexity of nonlinear two-point boundary-value problems. We deal with general systems of equations with general nonlinear boundary conditions, as well as with second-order scalar problems. Two types of information are considered: standard informa

We improve the results obtained by the first author in a recent paper where a problem raised by A. Ambrosetti, H. Brezis, and G. Cerami concerning the exact structure of the set of solutions for a class of two-point boundary value problems was solved. Here we study a more general problem and get mor