Nonlocal boundary-value problems with a shift

We investigate a quasi-linear boundary value problem of the form -div(α|∇u| p-2 ∇u) = 0 involving a general boundary map and mixed Neumann boundary conditions on a bounded Lipschitz domain. We show existence, uniqueness, and Hölder continuity of the weak solution of this mixed boundary value problem

The singular differential equation (g(x')) ' = f(t, x, x') together with the nonlocal boundary conditions x(0) = x(T) = -Tmin{x(t) : t E [0,T]} is considered. Here g E C°(]R) is an increasing and odd function, positive f satisfying the local Carath4odory conditions on [0, T] × (]R \ {0}) 2 may be si

In this article, we prove an existence result for a nonlocal boundary value problem at resonance concerning a second order differential equation. Our method is based upon the coincidence degree theory of Mawhin.