Boundary Value Problems with Local Generalized Nevanlinna Functions in the Boundary Condition

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

We show that if the Nevanlinna-Pick interpolation problem is solvable by a function mapping into a compact subset of the unit disc, then the problem remains solvable with the addition of any number of boundary interpolation conditions, provided the boundary interpolation values have modulus less tha

Using the theory of generalized functions, the method of boundary integral equations is developed to solve four non-stationary boundary-value problems of coupled thermoelastodynamics for media with anisotropy of the elastic properties and thermal isotropy. Regular integral representations of solutio