Inverse boundary value problems at the boundary—continuous dependence

## 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__

Based on the two-dimensional stationary Oseen equation we consider the problem to determine the shape of a cylindrical obstacle immersed in a #uid #ow from a knowledge of the #uid velocity on some arc outside the obstacle. First, we obtain a uniqueness result for this ill-posed and non-linear invers

## Abstract The main idea of the Trefftz approach to numerical modelling consists in the application of trial functions identically fulfilling governing partial differential equations of a considered problem. When boundary conditions of the problem are defined __a priori__ (direct formulation), the