Second order, multi-point problems with variable coefficients

Abstract

In this paper we consider the eigenvalue problem consisting of the equation -u" = r u, on (-1,1), where r ∈ C1[-1,1], \ r>0 and ∈ , together with the multi-point boundary conditions u( 1) = Σmi=1 i u(ηi), where m 1 are integers, and, for i = 1,...,m, i ∈ , ηi ∈ [-1,1], with ηi+ 1, ηi- -1. We show that if the coefficients i ∈ are sufficiently small (depending on r) then the spectral properties of this problem are similar to those of the usual separated problem, but if the coefficients i are not sufficiently small then these standard spectral properties need not hold. The spectral properties of such multi-point problems have been obtained before for the constant coefficient case (r 1), but the variable coefficient case has not been considered previously (apart from the existence of `principal' eigenvalues). Some nonlinear multi-point problems are also considered. We obtain a (partial) Rabinowitz-type result on global bifurcation from the eigenvalues, and various nonresonance conditions for existence of general solutions and also of nodal solutions --- these results rely on the spectral properties of the linear problem.